1 | // |
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2 | // ******************************************************************** |
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3 | // * License and Disclaimer * |
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4 | // * * |
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5 | // * The Geant4 software is copyright of the Copyright Holders of * |
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6 | // * the Geant4 Collaboration. It is provided under the terms and * |
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7 | // * conditions of the Geant4 Software License, included in the file * |
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8 | // * LICENSE and available at http://cern.ch/geant4/license . These * |
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9 | // * include a list of copyright holders. * |
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10 | // * * |
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11 | // * Neither the authors of this software system, nor their employing * |
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12 | // * institutes,nor the agencies providing financial support for this * |
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13 | // * work make any representation or warranty, express or implied, * |
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14 | // * regarding this software system or assume any liability for its * |
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15 | // * use. Please see the license in the file LICENSE and URL above * |
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16 | // * for the full disclaimer and the limitation of liability. * |
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17 | // * * |
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18 | // * This code implementation is the result of the scientific and * |
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19 | // * technical work of the GEANT4 collaboration. * |
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20 | // * By using, copying, modifying or distributing the software (or * |
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21 | // * any work based on the software) you agree to acknowledge its * |
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22 | // * use in resulting scientific publications, and indicate your * |
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23 | // * acceptance of all terms of the Geant4 Software license. * |
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24 | // ******************************************************************** |
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25 | // |
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26 | // |
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27 | // $Id: G4Cons.cc,v 1.60 2008/11/06 15:26:53 gcosmo Exp $ |
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28 | // GEANT4 tag $Name: geant4-09-02-cand-01 $ |
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29 | // |
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30 | // |
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31 | // class G4Cons |
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32 | // |
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33 | // Implementation for G4Cons class |
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34 | // |
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35 | // History: |
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36 | // |
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37 | // 03.05.05 V.Grichine: SurfaceNormal(p) according to J. Apostolakis proposal |
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38 | // 13.09.96 V.Grichine: Review and final modifications |
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39 | // ~1994 P.Kent: Created, as main part of the geometry prototype |
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40 | // -------------------------------------------------------------------- |
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41 | |
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42 | #include "G4Cons.hh" |
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43 | |
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44 | #include "G4VoxelLimits.hh" |
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45 | #include "G4AffineTransform.hh" |
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46 | #include "G4GeometryTolerance.hh" |
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47 | |
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48 | #include "G4VPVParameterisation.hh" |
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49 | |
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50 | #include "meshdefs.hh" |
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51 | |
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52 | #include "Randomize.hh" |
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53 | |
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54 | #include "G4VGraphicsScene.hh" |
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55 | #include "G4Polyhedron.hh" |
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56 | #include "G4NURBS.hh" |
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57 | #include "G4NURBSbox.hh" |
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58 | |
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59 | using namespace CLHEP; |
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60 | |
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61 | //////////////////////////////////////////////////////////////////////// |
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62 | // |
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63 | // Private enum: Not for external use - used by distanceToOut |
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64 | |
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65 | enum ESide {kNull,kRMin,kRMax,kSPhi,kEPhi,kPZ,kMZ}; |
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66 | |
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67 | // used by normal |
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68 | |
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69 | enum ENorm {kNRMin,kNRMax,kNSPhi,kNEPhi,kNZ}; |
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70 | |
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71 | ////////////////////////////////////////////////////////////////////////// |
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72 | // |
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73 | // constructor - check parameters, convert angles so 0<sphi+dpshi<=2_PI |
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74 | // - note if pDPhi>2PI then reset to 2PI |
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75 | |
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76 | G4Cons::G4Cons( const G4String& pName, |
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77 | G4double pRmin1, G4double pRmax1, |
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78 | G4double pRmin2, G4double pRmax2, |
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79 | G4double pDz, |
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80 | G4double pSPhi, G4double pDPhi) |
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81 | : G4CSGSolid(pName) |
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82 | { |
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83 | // Check z-len |
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84 | |
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85 | kRadTolerance = G4GeometryTolerance::GetInstance()->GetRadialTolerance(); |
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86 | kAngTolerance = G4GeometryTolerance::GetInstance()->GetAngularTolerance(); |
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87 | |
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88 | if ( pDz > 0 ) |
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89 | { |
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90 | fDz = pDz; |
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91 | } |
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92 | else |
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93 | { |
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94 | G4cerr << "ERROR - G4Cons()::G4Cons(): " << GetName() << G4endl |
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95 | << " Negative Z half-length ! - " |
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96 | << pDz << G4endl; |
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97 | G4Exception("G4Cons::G4Cons()", "InvalidSetup", |
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98 | FatalException, "Invalid Z half-length."); |
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99 | } |
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100 | |
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101 | // Check radii |
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102 | |
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103 | if ( (pRmin1<pRmax1) && (pRmin2<pRmax2) && (pRmin1>=0) && (pRmin2>=0) ) |
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104 | { |
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105 | |
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106 | fRmin1 = pRmin1 ; |
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107 | fRmax1 = pRmax1 ; |
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108 | fRmin2 = pRmin2 ; |
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109 | fRmax2 = pRmax2 ; |
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110 | if( (pRmin1 == 0.0) && (pRmin2 > 0.0) ) { fRmin1 = 1e3*kRadTolerance ; } |
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111 | if( (pRmin2 == 0.0) && (pRmin1 > 0.0) ) { fRmin2 = 1e3*kRadTolerance ; } |
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112 | } |
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113 | else |
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114 | { |
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115 | G4cerr << "ERROR - G4Cons()::G4Cons(): " << GetName() << G4endl |
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116 | << " Invalide values for radii ! - " |
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117 | << " pRmin1 = " << pRmin1 << ", pRmin2 = " << pRmin2 |
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118 | << ", pRmax1 = " << pRmax1 << ", pRmax2 = " << pRmax2 << G4endl; |
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119 | G4Exception("G4Cons::G4Cons()", "InvalidSetup", |
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120 | FatalException, "Invalid radii.") ; |
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121 | } |
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122 | |
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123 | fPhiFullCone = true; |
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124 | if ( pDPhi >= twopi-kAngTolerance*0.5 ) // Check angles |
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125 | { |
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126 | fDPhi=twopi; |
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127 | fSPhi=0; |
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128 | } |
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129 | else |
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130 | { |
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131 | fPhiFullCone = false; |
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132 | if ( pDPhi > 0 ) |
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133 | { |
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134 | fDPhi = pDPhi; |
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135 | } |
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136 | else |
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137 | { |
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138 | G4cerr << "ERROR - G4Cons()::G4Cons(): " << GetName() << G4endl |
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139 | << " Negative delta-Phi ! - " |
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140 | << pDPhi << G4endl; |
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141 | G4Exception("G4Cons::G4Cons()", "InvalidSetup", |
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142 | FatalException, "Invalid dphi."); |
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143 | } |
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144 | |
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145 | // Ensure fSphi in 0-2PI or -2PI-0 range if shape crosses 0 |
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146 | |
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147 | if ( pSPhi < 0 ) |
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148 | { |
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149 | fSPhi = twopi - std::fmod(std::fabs(pSPhi),twopi); |
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150 | } |
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151 | else |
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152 | { |
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153 | fSPhi = std::fmod(pSPhi,twopi) ; |
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154 | } |
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155 | if ( fSPhi+fDPhi > twopi ) |
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156 | { |
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157 | fSPhi -= twopi ; |
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158 | } |
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159 | } |
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160 | InitializeTrigonometry(); |
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161 | } |
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162 | |
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163 | /////////////////////////////////////////////////////////////////////// |
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164 | // |
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165 | // Fake default constructor - sets only member data and allocates memory |
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166 | // for usage restricted to object persistency. |
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167 | // |
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168 | G4Cons::G4Cons( __void__& a ) |
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169 | : G4CSGSolid(a) |
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170 | { |
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171 | } |
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172 | |
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173 | /////////////////////////////////////////////////////////////////////// |
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174 | // |
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175 | // Destructor |
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176 | |
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177 | G4Cons::~G4Cons() |
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178 | { |
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179 | } |
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180 | |
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181 | ///////////////////////////////////////////////////////////////////// |
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182 | // |
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183 | // Return whether point inside/outside/on surface |
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184 | |
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185 | EInside G4Cons::Inside(const G4ThreeVector& p) const |
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186 | { |
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187 | G4double r2, rl, rh, pPhi, tolRMin, tolRMax; // rh2, rl2 ; |
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188 | EInside in; |
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189 | static const G4double halfCarTolerance=kCarTolerance*0.5; |
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190 | static const G4double halfRadTolerance=kRadTolerance*0.5; |
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191 | static const G4double halfAngTolerance=kAngTolerance*0.5; |
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192 | |
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193 | if (std::fabs(p.z()) > fDz + halfCarTolerance ) { return in = kOutside; } |
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194 | else if(std::fabs(p.z()) >= fDz - halfCarTolerance ) { in = kSurface; } |
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195 | else { in = kInside; } |
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196 | |
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197 | r2 = p.x()*p.x() + p.y()*p.y() ; |
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198 | rl = 0.5*(fRmin2*(p.z() + fDz) + fRmin1*(fDz - p.z()))/fDz ; |
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199 | rh = 0.5*(fRmax2*(p.z()+fDz)+fRmax1*(fDz-p.z()))/fDz; |
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200 | |
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201 | // rh2 = rh*rh; |
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202 | |
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203 | tolRMin = rl - halfRadTolerance; |
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204 | if ( tolRMin < 0 ) { tolRMin = 0; } |
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205 | tolRMax = rh + halfRadTolerance; |
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206 | |
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207 | if ( (r2<tolRMin*tolRMin) || (r2>tolRMax*tolRMax) ) { return in = kOutside; } |
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208 | |
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209 | if (rl) { tolRMin = rl + halfRadTolerance; } |
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210 | else { tolRMin = 0.0; } |
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211 | tolRMax = rh - halfRadTolerance; |
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212 | |
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213 | if (in == kInside) // else it's kSurface already |
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214 | { |
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215 | if ( (r2 < tolRMin*tolRMin) || (r2 >= tolRMax*tolRMax) ) { in = kSurface; } |
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216 | } |
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217 | if ( !fPhiFullCone && ((p.x() != 0.0) || (p.y() != 0.0)) ) |
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218 | { |
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219 | pPhi = std::atan2(p.y(),p.x()) ; |
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220 | |
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221 | if ( pPhi < fSPhi - halfAngTolerance ) { pPhi += twopi; } |
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222 | else if ( pPhi > fSPhi + fDPhi + halfAngTolerance ) { pPhi -= twopi; } |
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223 | |
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224 | if ( (pPhi < fSPhi - halfAngTolerance) || |
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225 | (pPhi > fSPhi + fDPhi + halfAngTolerance) ) { return in = kOutside; } |
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226 | |
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227 | else if (in == kInside) // else it's kSurface anyway already |
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228 | { |
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229 | if ( (pPhi < fSPhi + halfAngTolerance) || |
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230 | (pPhi > fSPhi + fDPhi - halfAngTolerance) ) { in = kSurface; } |
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231 | } |
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232 | } |
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233 | else if ( !fPhiFullCone ) { in = kSurface; } |
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234 | |
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235 | return in ; |
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236 | } |
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237 | |
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238 | ///////////////////////////////////////////////////////////////////////// |
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239 | // |
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240 | // Dispatch to parameterisation for replication mechanism dimension |
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241 | // computation & modification. |
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242 | |
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243 | void G4Cons::ComputeDimensions( G4VPVParameterisation* p, |
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244 | const G4int n, |
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245 | const G4VPhysicalVolume* pRep ) |
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246 | { |
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247 | p->ComputeDimensions(*this,n,pRep) ; |
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248 | } |
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249 | |
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250 | |
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251 | /////////////////////////////////////////////////////////////////////////// |
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252 | // |
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253 | // Calculate extent under transform and specified limit |
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254 | |
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255 | G4bool G4Cons::CalculateExtent( const EAxis pAxis, |
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256 | const G4VoxelLimits& pVoxelLimit, |
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257 | const G4AffineTransform& pTransform, |
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258 | G4double& pMin, |
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259 | G4double& pMax ) const |
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260 | { |
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261 | if ( !pTransform.IsRotated() && (fDPhi == twopi) |
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262 | && (fRmin1 == 0) && (fRmin2 == 0) ) |
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263 | { |
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264 | // Special case handling for unrotated solid cones |
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265 | // Compute z/x/y mins and maxs for bounding box respecting limits, |
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266 | // with early returns if outside limits. Then switch() on pAxis, |
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267 | // and compute exact x and y limit for x/y case |
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268 | |
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269 | G4double xoffset, xMin, xMax ; |
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270 | G4double yoffset, yMin, yMax ; |
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271 | G4double zoffset, zMin, zMax ; |
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272 | |
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273 | G4double diff1, diff2, maxDiff, newMin, newMax, RMax ; |
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274 | G4double xoff1, xoff2, yoff1, yoff2 ; |
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275 | |
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276 | zoffset = pTransform.NetTranslation().z(); |
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277 | zMin = zoffset - fDz ; |
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278 | zMax = zoffset + fDz ; |
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279 | |
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280 | if (pVoxelLimit.IsZLimited()) |
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281 | { |
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282 | if( (zMin > pVoxelLimit.GetMaxZExtent() + kCarTolerance) || |
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283 | (zMax < pVoxelLimit.GetMinZExtent() - kCarTolerance) ) |
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284 | { |
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285 | return false ; |
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286 | } |
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287 | else |
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288 | { |
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289 | if ( zMin < pVoxelLimit.GetMinZExtent() ) |
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290 | { |
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291 | zMin = pVoxelLimit.GetMinZExtent() ; |
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292 | } |
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293 | if ( zMax > pVoxelLimit.GetMaxZExtent() ) |
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294 | { |
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295 | zMax = pVoxelLimit.GetMaxZExtent() ; |
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296 | } |
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297 | } |
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298 | } |
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299 | xoffset = pTransform.NetTranslation().x() ; |
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300 | RMax = (fRmax2 >= fRmax1) ? zMax : zMin ; |
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301 | xMax = xoffset + (fRmax1 + fRmax2)*0.5 + |
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302 | (RMax - zoffset)*(fRmax2 - fRmax1)/(2*fDz) ; |
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303 | xMin = 2*xoffset-xMax ; |
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304 | |
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305 | if (pVoxelLimit.IsXLimited()) |
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306 | { |
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307 | if ( (xMin > pVoxelLimit.GetMaxXExtent() + kCarTolerance) || |
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308 | (xMax < pVoxelLimit.GetMinXExtent() - kCarTolerance) ) |
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309 | { |
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310 | return false ; |
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311 | } |
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312 | else |
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313 | { |
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314 | if ( xMin < pVoxelLimit.GetMinXExtent() ) |
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315 | { |
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316 | xMin = pVoxelLimit.GetMinXExtent() ; |
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317 | } |
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318 | if ( xMax > pVoxelLimit.GetMaxXExtent() ) |
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319 | { |
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320 | xMax=pVoxelLimit.GetMaxXExtent() ; |
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321 | } |
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322 | } |
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323 | } |
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324 | yoffset = pTransform.NetTranslation().y() ; |
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325 | yMax = yoffset + (fRmax1 + fRmax2)*0.5 + |
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326 | (RMax - zoffset)*(fRmax2 - fRmax1)/(2*fDz) ; |
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327 | yMin = 2*yoffset-yMax ; |
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328 | RMax = yMax - yoffset ; // = max radius due to Zmax/Zmin cuttings |
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329 | |
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330 | if (pVoxelLimit.IsYLimited()) |
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331 | { |
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332 | if ( (yMin > pVoxelLimit.GetMaxYExtent() + kCarTolerance) || |
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333 | (yMax < pVoxelLimit.GetMinYExtent() - kCarTolerance) ) |
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334 | { |
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335 | return false ; |
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336 | } |
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337 | else |
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338 | { |
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339 | if ( yMin < pVoxelLimit.GetMinYExtent() ) |
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340 | { |
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341 | yMin = pVoxelLimit.GetMinYExtent() ; |
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342 | } |
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343 | if ( yMax > pVoxelLimit.GetMaxYExtent() ) |
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344 | { |
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345 | yMax = pVoxelLimit.GetMaxYExtent() ; |
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346 | } |
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347 | } |
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348 | } |
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349 | switch (pAxis) // Known to cut cones |
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350 | { |
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351 | case kXAxis: |
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352 | yoff1 = yoffset - yMin ; |
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353 | yoff2 = yMax - yoffset ; |
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354 | |
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355 | if ((yoff1 >= 0) && (yoff2 >= 0)) // Y limits cross max/min x |
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356 | { // => no change |
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357 | pMin = xMin ; |
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358 | pMax = xMax ; |
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359 | } |
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360 | else |
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361 | { |
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362 | // Y limits don't cross max/min x => compute max delta x, |
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363 | // hence new mins/maxs |
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364 | |
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365 | diff1 = std::sqrt(RMax*RMax - yoff1*yoff1) ; |
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366 | diff2 = std::sqrt(RMax*RMax - yoff2*yoff2) ; |
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367 | maxDiff = (diff1>diff2) ? diff1:diff2 ; |
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368 | newMin = xoffset - maxDiff ; |
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369 | newMax = xoffset + maxDiff ; |
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370 | pMin = ( newMin < xMin ) ? xMin : newMin ; |
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371 | pMax = ( newMax > xMax) ? xMax : newMax ; |
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372 | } |
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373 | break ; |
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374 | |
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375 | case kYAxis: |
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376 | xoff1 = xoffset - xMin ; |
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377 | xoff2 = xMax - xoffset ; |
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378 | |
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379 | if ((xoff1 >= 0) && (xoff2 >= 0) ) // X limits cross max/min y |
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380 | { // => no change |
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381 | pMin = yMin ; |
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382 | pMax = yMax ; |
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383 | } |
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384 | else |
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385 | { |
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386 | // X limits don't cross max/min y => compute max delta y, |
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387 | // hence new mins/maxs |
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388 | |
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389 | diff1 = std::sqrt(RMax*RMax - xoff1*xoff1) ; |
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390 | diff2 = std::sqrt(RMax*RMax-xoff2*xoff2) ; |
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391 | maxDiff = (diff1 > diff2) ? diff1:diff2 ; |
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392 | newMin = yoffset - maxDiff ; |
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393 | newMax = yoffset + maxDiff ; |
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394 | pMin = (newMin < yMin) ? yMin : newMin ; |
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395 | pMax = (newMax > yMax) ? yMax : newMax ; |
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396 | } |
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397 | break ; |
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398 | |
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399 | case kZAxis: |
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400 | pMin = zMin ; |
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401 | pMax = zMax ; |
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402 | break ; |
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403 | |
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404 | default: |
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405 | break ; |
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406 | } |
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407 | pMin -= kCarTolerance ; |
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408 | pMax += kCarTolerance ; |
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409 | |
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410 | return true ; |
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411 | } |
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412 | else // Calculate rotated vertex coordinates |
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413 | { |
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414 | G4int i, noEntries, noBetweenSections4 ; |
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415 | G4bool existsAfterClip = false ; |
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416 | G4ThreeVectorList* vertices = CreateRotatedVertices(pTransform) ; |
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417 | |
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418 | pMin = +kInfinity ; |
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419 | pMax = -kInfinity ; |
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420 | |
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421 | noEntries = vertices->size() ; |
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422 | noBetweenSections4 = noEntries-4 ; |
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423 | |
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424 | for ( i = 0 ; i < noEntries ; i += 4 ) |
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425 | { |
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426 | ClipCrossSection(vertices, i, pVoxelLimit, pAxis, pMin, pMax) ; |
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427 | } |
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428 | for ( i = 0 ; i < noBetweenSections4 ; i += 4 ) |
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429 | { |
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430 | ClipBetweenSections(vertices, i, pVoxelLimit, pAxis, pMin, pMax) ; |
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431 | } |
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432 | if ( (pMin != kInfinity) || (pMax != -kInfinity) ) |
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433 | { |
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434 | existsAfterClip = true ; |
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435 | |
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436 | // Add 2*tolerance to avoid precision troubles |
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437 | |
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438 | pMin -= kCarTolerance ; |
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439 | pMax += kCarTolerance ; |
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440 | } |
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441 | else |
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442 | { |
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443 | // Check for case where completely enveloping clipping volume |
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444 | // If point inside then we are confident that the solid completely |
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445 | // envelopes the clipping volume. Hence set min/max extents according |
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446 | // to clipping volume extents along the specified axis. |
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447 | |
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448 | G4ThreeVector clipCentre( |
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449 | (pVoxelLimit.GetMinXExtent() + pVoxelLimit.GetMaxXExtent())*0.5, |
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450 | (pVoxelLimit.GetMinYExtent() + pVoxelLimit.GetMaxYExtent())*0.5, |
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451 | (pVoxelLimit.GetMinZExtent() + pVoxelLimit.GetMaxZExtent())*0.5 ) ; |
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452 | |
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453 | if (Inside(pTransform.Inverse().TransformPoint(clipCentre)) != kOutside) |
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454 | { |
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455 | existsAfterClip = true ; |
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456 | pMin = pVoxelLimit.GetMinExtent(pAxis) ; |
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457 | pMax = pVoxelLimit.GetMaxExtent(pAxis) ; |
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458 | } |
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459 | } |
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460 | delete vertices ; |
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461 | return existsAfterClip ; |
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462 | } |
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463 | } |
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464 | |
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465 | //////////////////////////////////////////////////////////////////////// |
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466 | // |
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467 | // Return unit normal of surface closest to p |
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468 | // - note if point on z axis, ignore phi divided sides |
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469 | // - unsafe if point close to z axis a rmin=0 - no explicit checks |
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470 | |
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471 | G4ThreeVector G4Cons::SurfaceNormal( const G4ThreeVector& p) const |
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472 | { |
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473 | G4int noSurfaces = 0; |
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474 | G4double rho, pPhi; |
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475 | G4double distZ, distRMin, distRMax; |
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476 | G4double distSPhi = kInfinity, distEPhi = kInfinity; |
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477 | G4double tanRMin, secRMin, pRMin, widRMin; |
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478 | G4double tanRMax, secRMax, pRMax, widRMax; |
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479 | |
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480 | static const G4double delta = 0.5*kCarTolerance; |
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481 | static const G4double dAngle = 0.5*kAngTolerance; |
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482 | |
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483 | G4ThreeVector norm, sumnorm(0.,0.,0.), nZ = G4ThreeVector(0.,0.,1.); |
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484 | G4ThreeVector nR, nr(0.,0.,0.), nPs, nPe; |
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485 | |
---|
486 | distZ = std::fabs(std::fabs(p.z()) - fDz); |
---|
487 | rho = std::sqrt(p.x()*p.x() + p.y()*p.y()); |
---|
488 | |
---|
489 | tanRMin = (fRmin2 - fRmin1)*0.5/fDz; |
---|
490 | secRMin = std::sqrt(1 + tanRMin*tanRMin); |
---|
491 | pRMin = rho - p.z()*tanRMin; |
---|
492 | widRMin = fRmin2 - fDz*tanRMin; |
---|
493 | distRMin = std::fabs(pRMin - widRMin)/secRMin; |
---|
494 | |
---|
495 | tanRMax = (fRmax2 - fRmax1)*0.5/fDz; |
---|
496 | secRMax = std::sqrt(1+tanRMax*tanRMax); |
---|
497 | pRMax = rho - p.z()*tanRMax; |
---|
498 | widRMax = fRmax2 - fDz*tanRMax; |
---|
499 | distRMax = std::fabs(pRMax - widRMax)/secRMax; |
---|
500 | |
---|
501 | if (!fPhiFullCone) // Protected against (0,0,z) |
---|
502 | { |
---|
503 | if ( rho ) |
---|
504 | { |
---|
505 | pPhi = std::atan2(p.y(),p.x()); |
---|
506 | |
---|
507 | if (pPhi < fSPhi-delta) { pPhi += twopi; } |
---|
508 | else if (pPhi > fSPhi+fDPhi+delta) { pPhi -= twopi; } |
---|
509 | |
---|
510 | distSPhi = std::fabs( pPhi - fSPhi ); |
---|
511 | distEPhi = std::fabs( pPhi - fSPhi - fDPhi ); |
---|
512 | } |
---|
513 | else if( !(fRmin1) || !(fRmin2) ) |
---|
514 | { |
---|
515 | distSPhi = 0.; |
---|
516 | distEPhi = 0.; |
---|
517 | } |
---|
518 | nPs = G4ThreeVector(std::sin(fSPhi), -std::cos(fSPhi), 0); |
---|
519 | nPe = G4ThreeVector(-std::sin(fSPhi+fDPhi), std::cos(fSPhi+fDPhi), 0); |
---|
520 | } |
---|
521 | if ( rho > delta ) |
---|
522 | { |
---|
523 | nR = G4ThreeVector(p.x()/rho/secRMax, p.y()/rho/secRMax, -tanRMax/secRMax); |
---|
524 | if (fRmin1 || fRmin2) |
---|
525 | { |
---|
526 | nr = G4ThreeVector(-p.x()/rho/secRMin,-p.y()/rho/secRMin,tanRMin/secRMin); |
---|
527 | } |
---|
528 | } |
---|
529 | |
---|
530 | if( distRMax <= delta ) |
---|
531 | { |
---|
532 | noSurfaces ++; |
---|
533 | sumnorm += nR; |
---|
534 | } |
---|
535 | if( (fRmin1 || fRmin2) && (distRMin <= delta) ) |
---|
536 | { |
---|
537 | noSurfaces ++; |
---|
538 | sumnorm += nr; |
---|
539 | } |
---|
540 | if( !fPhiFullCone ) |
---|
541 | { |
---|
542 | if (distSPhi <= dAngle) |
---|
543 | { |
---|
544 | noSurfaces ++; |
---|
545 | sumnorm += nPs; |
---|
546 | } |
---|
547 | if (distEPhi <= dAngle) |
---|
548 | { |
---|
549 | noSurfaces ++; |
---|
550 | sumnorm += nPe; |
---|
551 | } |
---|
552 | } |
---|
553 | if (distZ <= delta) |
---|
554 | { |
---|
555 | noSurfaces ++; |
---|
556 | if ( p.z() >= 0.) { sumnorm += nZ; } |
---|
557 | else { sumnorm -= nZ; } |
---|
558 | } |
---|
559 | if ( noSurfaces == 0 ) |
---|
560 | { |
---|
561 | #ifdef G4CSGDEBUG |
---|
562 | G4Exception("G4Cons::SurfaceNormal(p)", "Notification", JustWarning, |
---|
563 | "Point p is not on surface !?" ); |
---|
564 | #endif |
---|
565 | norm = ApproxSurfaceNormal(p); |
---|
566 | } |
---|
567 | else if ( noSurfaces == 1 ) { norm = sumnorm; } |
---|
568 | else { norm = sumnorm.unit(); } |
---|
569 | |
---|
570 | return norm ; |
---|
571 | } |
---|
572 | |
---|
573 | //////////////////////////////////////////////////////////////////////////// |
---|
574 | // |
---|
575 | // Algorithm for SurfaceNormal() following the original specification |
---|
576 | // for points not on the surface |
---|
577 | |
---|
578 | G4ThreeVector G4Cons::ApproxSurfaceNormal( const G4ThreeVector& p ) const |
---|
579 | { |
---|
580 | ENorm side ; |
---|
581 | G4ThreeVector norm ; |
---|
582 | G4double rho, phi ; |
---|
583 | G4double distZ, distRMin, distRMax, distSPhi, distEPhi, distMin ; |
---|
584 | G4double tanRMin, secRMin, pRMin, widRMin ; |
---|
585 | G4double tanRMax, secRMax, pRMax, widRMax ; |
---|
586 | |
---|
587 | distZ = std::fabs(std::fabs(p.z()) - fDz) ; |
---|
588 | rho = std::sqrt(p.x()*p.x() + p.y()*p.y()) ; |
---|
589 | |
---|
590 | tanRMin = (fRmin2 - fRmin1)*0.5/fDz ; |
---|
591 | secRMin = std::sqrt(1 + tanRMin*tanRMin) ; |
---|
592 | pRMin = rho - p.z()*tanRMin ; |
---|
593 | widRMin = fRmin2 - fDz*tanRMin ; |
---|
594 | distRMin = std::fabs(pRMin - widRMin)/secRMin ; |
---|
595 | |
---|
596 | tanRMax = (fRmax2 - fRmax1)*0.5/fDz ; |
---|
597 | secRMax = std::sqrt(1+tanRMax*tanRMax) ; |
---|
598 | pRMax = rho - p.z()*tanRMax ; |
---|
599 | widRMax = fRmax2 - fDz*tanRMax ; |
---|
600 | distRMax = std::fabs(pRMax - widRMax)/secRMax ; |
---|
601 | |
---|
602 | if (distRMin < distRMax) // First minimum |
---|
603 | { |
---|
604 | if (distZ < distRMin) |
---|
605 | { |
---|
606 | distMin = distZ ; |
---|
607 | side = kNZ ; |
---|
608 | } |
---|
609 | else |
---|
610 | { |
---|
611 | distMin = distRMin ; |
---|
612 | side = kNRMin ; |
---|
613 | } |
---|
614 | } |
---|
615 | else |
---|
616 | { |
---|
617 | if (distZ < distRMax) |
---|
618 | { |
---|
619 | distMin = distZ ; |
---|
620 | side = kNZ ; |
---|
621 | } |
---|
622 | else |
---|
623 | { |
---|
624 | distMin = distRMax ; |
---|
625 | side = kNRMax ; |
---|
626 | } |
---|
627 | } |
---|
628 | if ( !fPhiFullCone && rho ) // Protected against (0,0,z) |
---|
629 | { |
---|
630 | phi = std::atan2(p.y(),p.x()) ; |
---|
631 | |
---|
632 | if (phi < 0) { phi += twopi; } |
---|
633 | |
---|
634 | if (fSPhi < 0) { distSPhi = std::fabs(phi - (fSPhi + twopi))*rho; } |
---|
635 | else { distSPhi = std::fabs(phi - fSPhi)*rho; } |
---|
636 | |
---|
637 | distEPhi = std::fabs(phi - fSPhi - fDPhi)*rho ; |
---|
638 | |
---|
639 | // Find new minimum |
---|
640 | |
---|
641 | if (distSPhi < distEPhi) |
---|
642 | { |
---|
643 | if (distSPhi < distMin) { side = kNSPhi; } |
---|
644 | } |
---|
645 | else |
---|
646 | { |
---|
647 | if (distEPhi < distMin) { side = kNEPhi; } |
---|
648 | } |
---|
649 | } |
---|
650 | switch (side) |
---|
651 | { |
---|
652 | case kNRMin: // Inner radius |
---|
653 | rho *= secRMin ; |
---|
654 | norm = G4ThreeVector(-p.x()/rho, -p.y()/rho, tanRMin/secRMin) ; |
---|
655 | break ; |
---|
656 | case kNRMax: // Outer radius |
---|
657 | rho *= secRMax ; |
---|
658 | norm = G4ThreeVector(p.x()/rho, p.y()/rho, -tanRMax/secRMax) ; |
---|
659 | break ; |
---|
660 | case kNZ: // +/- dz |
---|
661 | if (p.z() > 0) { norm = G4ThreeVector(0,0,1); } |
---|
662 | else { norm = G4ThreeVector(0,0,-1); } |
---|
663 | break ; |
---|
664 | case kNSPhi: |
---|
665 | norm = G4ThreeVector(std::sin(fSPhi), -std::cos(fSPhi), 0) ; |
---|
666 | break ; |
---|
667 | case kNEPhi: |
---|
668 | norm=G4ThreeVector(-std::sin(fSPhi+fDPhi), std::cos(fSPhi+fDPhi), 0) ; |
---|
669 | break ; |
---|
670 | default: |
---|
671 | DumpInfo(); |
---|
672 | G4Exception("G4Cons::ApproxSurfaceNormal()", "Notification", JustWarning, |
---|
673 | "Undefined side for valid surface normal to solid.") ; |
---|
674 | break ; |
---|
675 | } |
---|
676 | return norm ; |
---|
677 | } |
---|
678 | |
---|
679 | //////////////////////////////////////////////////////////////////////// |
---|
680 | // |
---|
681 | // Calculate distance to shape from outside, along normalised vector |
---|
682 | // - return kInfinity if no intersection, or intersection distance <= tolerance |
---|
683 | // |
---|
684 | // - Compute the intersection with the z planes |
---|
685 | // - if at valid r, phi, return |
---|
686 | // |
---|
687 | // -> If point is outside cone, compute intersection with rmax1*0.5 |
---|
688 | // - if at valid phi,z return |
---|
689 | // - if inside outer cone, handle case when on tolerant outer cone |
---|
690 | // boundary and heading inwards(->0 to in) |
---|
691 | // |
---|
692 | // -> Compute intersection with inner cone, taking largest +ve root |
---|
693 | // - if valid (in z,phi), save intersction |
---|
694 | // |
---|
695 | // -> If phi segmented, compute intersections with phi half planes |
---|
696 | // - return smallest of valid phi intersections and |
---|
697 | // inner radius intersection |
---|
698 | // |
---|
699 | // NOTE: |
---|
700 | // - `if valid' implies tolerant checking of intersection points |
---|
701 | // - z, phi intersection from Tubs |
---|
702 | |
---|
703 | G4double G4Cons::DistanceToIn( const G4ThreeVector& p, |
---|
704 | const G4ThreeVector& v ) const |
---|
705 | { |
---|
706 | G4double snxt = kInfinity ; // snxt = default return value |
---|
707 | |
---|
708 | static const G4double halfCarTolerance=kCarTolerance*0.5; |
---|
709 | static const G4double halfRadTolerance=kRadTolerance*0.5; |
---|
710 | |
---|
711 | G4double tanRMax,secRMax,rMaxAv,rMaxOAv ; // Data for cones |
---|
712 | G4double tanRMin,secRMin,rMinAv,rMinIAv,rMinOAv ; |
---|
713 | G4double rout,rin ; |
---|
714 | |
---|
715 | G4double tolORMin,tolORMin2,tolIRMin,tolIRMin2 ; // `generous' radii squared |
---|
716 | G4double tolORMax2,tolIRMax,tolIRMax2 ; |
---|
717 | G4double tolODz,tolIDz ; |
---|
718 | |
---|
719 | G4double Dist,s,xi,yi,zi,ri=0.,rhoi2,cosPsi ; // Intersection point variables |
---|
720 | |
---|
721 | G4double t1,t2,t3,b,c,d ; // Quadratic solver variables |
---|
722 | G4double nt1,nt2,nt3 ; |
---|
723 | G4double Comp ; |
---|
724 | |
---|
725 | // Cone Precalcs |
---|
726 | |
---|
727 | tanRMin = (fRmin2 - fRmin1)*0.5/fDz ; |
---|
728 | secRMin = std::sqrt(1.0 + tanRMin*tanRMin) ; |
---|
729 | rMinAv = (fRmin1 + fRmin2)*0.5 ; |
---|
730 | |
---|
731 | if (rMinAv > halfRadTolerance) |
---|
732 | { |
---|
733 | rMinOAv = rMinAv - halfRadTolerance ; |
---|
734 | rMinIAv = rMinAv + halfRadTolerance ; |
---|
735 | } |
---|
736 | else |
---|
737 | { |
---|
738 | rMinOAv = 0.0 ; |
---|
739 | rMinIAv = 0.0 ; |
---|
740 | } |
---|
741 | tanRMax = (fRmax2 - fRmax1)*0.5/fDz ; |
---|
742 | secRMax = std::sqrt(1.0 + tanRMax*tanRMax) ; |
---|
743 | rMaxAv = (fRmax1 + fRmax2)*0.5 ; |
---|
744 | rMaxOAv = rMaxAv + halfRadTolerance ; |
---|
745 | |
---|
746 | // Intersection with z-surfaces |
---|
747 | |
---|
748 | tolIDz = fDz - halfCarTolerance ; |
---|
749 | tolODz = fDz + halfCarTolerance ; |
---|
750 | |
---|
751 | if (std::fabs(p.z()) >= tolIDz) |
---|
752 | { |
---|
753 | if ( p.z()*v.z() < 0 ) // at +Z going in -Z or visa versa |
---|
754 | { |
---|
755 | s = (std::fabs(p.z()) - fDz)/std::fabs(v.z()) ; // Z intersect distance |
---|
756 | |
---|
757 | if( s < 0.0 ) { s = 0.0; } // negative dist -> zero |
---|
758 | |
---|
759 | xi = p.x() + s*v.x() ; // Intersection coords |
---|
760 | yi = p.y() + s*v.y() ; |
---|
761 | rhoi2 = xi*xi + yi*yi ; |
---|
762 | |
---|
763 | // Check validity of intersection |
---|
764 | // Calculate (outer) tolerant radi^2 at intersecion |
---|
765 | |
---|
766 | if (v.z() > 0) |
---|
767 | { |
---|
768 | tolORMin = fRmin1 - halfRadTolerance*secRMin ; |
---|
769 | tolIRMin = fRmin1 + halfRadTolerance*secRMin ; |
---|
770 | tolIRMax = fRmax1 - halfRadTolerance*secRMin ; |
---|
771 | tolORMax2 = (fRmax1 + halfRadTolerance*secRMax)* |
---|
772 | (fRmax1 + halfRadTolerance*secRMax) ; |
---|
773 | } |
---|
774 | else |
---|
775 | { |
---|
776 | tolORMin = fRmin2 - halfRadTolerance*secRMin ; |
---|
777 | tolIRMin = fRmin2 + halfRadTolerance*secRMin ; |
---|
778 | tolIRMax = fRmax2 - halfRadTolerance*secRMin ; |
---|
779 | tolORMax2 = (fRmax2 + halfRadTolerance*secRMax)* |
---|
780 | (fRmax2 + halfRadTolerance*secRMax) ; |
---|
781 | } |
---|
782 | if ( tolORMin > 0 ) |
---|
783 | { |
---|
784 | tolORMin2 = tolORMin*tolORMin ; |
---|
785 | tolIRMin2 = tolIRMin*tolIRMin ; |
---|
786 | } |
---|
787 | else |
---|
788 | { |
---|
789 | tolORMin2 = 0.0 ; |
---|
790 | tolIRMin2 = 0.0 ; |
---|
791 | } |
---|
792 | if ( tolIRMax > 0 ) { tolIRMax2 = tolIRMax*tolIRMax; } |
---|
793 | else { tolIRMax2 = 0.0; } |
---|
794 | |
---|
795 | if ( (tolIRMin2 <= rhoi2) && (rhoi2 <= tolIRMax2) ) |
---|
796 | { |
---|
797 | if ( !fPhiFullCone && rhoi2 ) |
---|
798 | { |
---|
799 | // Psi = angle made with central (average) phi of shape |
---|
800 | |
---|
801 | cosPsi = (xi*cosCPhi + yi*sinCPhi)/std::sqrt(rhoi2) ; |
---|
802 | |
---|
803 | if (cosPsi >= cosHDPhiIT) { return s; } |
---|
804 | } |
---|
805 | else |
---|
806 | { |
---|
807 | return s; |
---|
808 | } |
---|
809 | } |
---|
810 | } |
---|
811 | else // On/outside extent, and heading away -> cannot intersect |
---|
812 | { |
---|
813 | return snxt ; |
---|
814 | } |
---|
815 | } |
---|
816 | |
---|
817 | // ----> Can not intersect z surfaces |
---|
818 | |
---|
819 | |
---|
820 | // Intersection with outer cone (possible return) and |
---|
821 | // inner cone (must also check phi) |
---|
822 | // |
---|
823 | // Intersection point (xi,yi,zi) on line x=p.x+t*v.x etc. |
---|
824 | // |
---|
825 | // Intersects with x^2+y^2=(a*z+b)^2 |
---|
826 | // |
---|
827 | // where a=tanRMax or tanRMin |
---|
828 | // b=rMaxAv or rMinAv |
---|
829 | // |
---|
830 | // (vx^2+vy^2-(a*vz)^2)t^2+2t(pxvx+pyvy-a*vz(a*pz+b))+px^2+py^2-(a*pz+b)^2=0 ; |
---|
831 | // t1 t2 t3 |
---|
832 | // |
---|
833 | // \--------u-------/ \-----------v----------/ \---------w--------/ |
---|
834 | // |
---|
835 | |
---|
836 | t1 = 1.0 - v.z()*v.z() ; |
---|
837 | t2 = p.x()*v.x() + p.y()*v.y() ; |
---|
838 | t3 = p.x()*p.x() + p.y()*p.y() ; |
---|
839 | rin = tanRMin*p.z() + rMinAv ; |
---|
840 | rout = tanRMax*p.z() + rMaxAv ; |
---|
841 | |
---|
842 | // Outer Cone Intersection |
---|
843 | // Must be outside/on outer cone for valid intersection |
---|
844 | |
---|
845 | nt1 = t1 - (tanRMax*v.z())*(tanRMax*v.z()) ; |
---|
846 | nt2 = t2 - tanRMax*v.z()*rout ; |
---|
847 | nt3 = t3 - rout*rout ; |
---|
848 | |
---|
849 | if (std::fabs(nt1) > kRadTolerance) // Equation quadratic => 2 roots |
---|
850 | { |
---|
851 | b = nt2/nt1; |
---|
852 | c = nt3/nt1; |
---|
853 | d = b*b-c ; |
---|
854 | if ( (nt3 > rout*kRadTolerance*secRMax) || (rout < 0) ) |
---|
855 | { |
---|
856 | // If outside real cone (should be rho-rout>kRadTolerance*0.5 |
---|
857 | // NOT rho^2 etc) saves a std::sqrt() at expense of accuracy |
---|
858 | |
---|
859 | if (d >= 0) |
---|
860 | { |
---|
861 | |
---|
862 | if ((rout < 0) && (nt3 <= 0)) |
---|
863 | { |
---|
864 | // Inside `shadow cone' with -ve radius |
---|
865 | // -> 2nd root could be on real cone |
---|
866 | |
---|
867 | s = -b + std::sqrt(d) ; |
---|
868 | } |
---|
869 | else |
---|
870 | { |
---|
871 | if ((b <= 0) && (c >= 0)) // both >=0, try smaller root |
---|
872 | { |
---|
873 | s = -b - std::sqrt(d) ; |
---|
874 | } |
---|
875 | else |
---|
876 | { |
---|
877 | if ( c <= 0 ) // second >=0 |
---|
878 | { |
---|
879 | s = -b + std::sqrt(d) ; |
---|
880 | } |
---|
881 | else // both negative, travel away |
---|
882 | { |
---|
883 | return kInfinity ; |
---|
884 | } |
---|
885 | } |
---|
886 | } |
---|
887 | if ( s > 0 ) // If 'forwards'. Check z intersection |
---|
888 | { |
---|
889 | zi = p.z() + s*v.z() ; |
---|
890 | |
---|
891 | if (std::fabs(zi) <= tolODz) |
---|
892 | { |
---|
893 | // Z ok. Check phi intersection if reqd |
---|
894 | |
---|
895 | if ( fPhiFullCone ) { return s; } |
---|
896 | else |
---|
897 | { |
---|
898 | xi = p.x() + s*v.x() ; |
---|
899 | yi = p.y() + s*v.y() ; |
---|
900 | ri = rMaxAv + zi*tanRMax ; |
---|
901 | cosPsi = (xi*cosCPhi + yi*sinCPhi)/ri ; |
---|
902 | |
---|
903 | if ( cosPsi >= cosHDPhiIT ) { return s; } |
---|
904 | } |
---|
905 | } |
---|
906 | } // end if (s>0) |
---|
907 | } |
---|
908 | } |
---|
909 | else |
---|
910 | { |
---|
911 | // Inside outer cone |
---|
912 | // check not inside, and heading through G4Cons (-> 0 to in) |
---|
913 | |
---|
914 | if ( ( t3 > (rin + halfRadTolerance*secRMin)* |
---|
915 | (rin + halfRadTolerance*secRMin) ) |
---|
916 | && (nt2 < 0) && (d >= 0) && (std::fabs(p.z()) <= tolIDz) ) |
---|
917 | { |
---|
918 | // Inside cones, delta r -ve, inside z extent |
---|
919 | |
---|
920 | if ( !fPhiFullCone ) |
---|
921 | { |
---|
922 | cosPsi = (p.x()*cosCPhi + p.y()*sinCPhi)/std::sqrt(t3) ; |
---|
923 | |
---|
924 | if (cosPsi >= cosHDPhiIT) { return 0.0; } |
---|
925 | } |
---|
926 | else { return 0.0; } |
---|
927 | } |
---|
928 | } |
---|
929 | } |
---|
930 | else // Single root case |
---|
931 | { |
---|
932 | if ( std::fabs(nt2) > kRadTolerance ) |
---|
933 | { |
---|
934 | s = -0.5*nt3/nt2 ; |
---|
935 | |
---|
936 | if ( s < 0 ) { return kInfinity; } // travel away |
---|
937 | else // s >= 0, If 'forwards'. Check z intersection |
---|
938 | { |
---|
939 | zi = p.z() + s*v.z() ; |
---|
940 | |
---|
941 | if ((std::fabs(zi) <= tolODz) && (nt2 < 0)) |
---|
942 | { |
---|
943 | // Z ok. Check phi intersection if reqd |
---|
944 | |
---|
945 | if ( fPhiFullCone ) { return s; } |
---|
946 | else |
---|
947 | { |
---|
948 | xi = p.x() + s*v.x() ; |
---|
949 | yi = p.y() + s*v.y() ; |
---|
950 | ri = rMaxAv + zi*tanRMax ; |
---|
951 | cosPsi = (xi*cosCPhi + yi*sinCPhi)/ri ; |
---|
952 | |
---|
953 | if (cosPsi >= cosHDPhiIT) { return s; } |
---|
954 | } |
---|
955 | } |
---|
956 | } |
---|
957 | } |
---|
958 | else // travel || cone surface from its origin |
---|
959 | { |
---|
960 | s = kInfinity ; |
---|
961 | } |
---|
962 | } |
---|
963 | |
---|
964 | // Inner Cone Intersection |
---|
965 | // o Space is divided into 3 areas: |
---|
966 | // 1) Radius greater than real inner cone & imaginary cone & outside |
---|
967 | // tolerance |
---|
968 | // 2) Radius less than inner or imaginary cone & outside tolarance |
---|
969 | // 3) Within tolerance of real or imaginary cones |
---|
970 | // - Extra checks needed for 3's intersections |
---|
971 | // => lots of duplicated code |
---|
972 | |
---|
973 | if (rMinAv) |
---|
974 | { |
---|
975 | nt1 = t1 - (tanRMin*v.z())*(tanRMin*v.z()) ; |
---|
976 | nt2 = t2 - tanRMin*v.z()*rin ; |
---|
977 | nt3 = t3 - rin*rin ; |
---|
978 | |
---|
979 | if ( nt1 ) |
---|
980 | { |
---|
981 | if ( nt3 > rin*kRadTolerance*secRMin ) |
---|
982 | { |
---|
983 | // At radius greater than real & imaginary cones |
---|
984 | // -> 2nd root, with zi check |
---|
985 | |
---|
986 | b = nt2/nt1 ; |
---|
987 | c = nt3/nt1 ; |
---|
988 | d = b*b-c ; |
---|
989 | if (d >= 0) // > 0 |
---|
990 | { |
---|
991 | s = -b + std::sqrt(d) ; |
---|
992 | |
---|
993 | if ( s >= 0 ) // > 0 |
---|
994 | { |
---|
995 | zi = p.z() + s*v.z() ; |
---|
996 | |
---|
997 | if ( std::fabs(zi) <= tolODz ) |
---|
998 | { |
---|
999 | if ( !fPhiFullCone ) |
---|
1000 | { |
---|
1001 | xi = p.x() + s*v.x() ; |
---|
1002 | yi = p.y() + s*v.y() ; |
---|
1003 | ri = rMinAv + zi*tanRMin ; |
---|
1004 | cosPsi = (xi*cosCPhi + yi*sinCPhi)/ri ; |
---|
1005 | |
---|
1006 | if (cosPsi >= cosHDPhiIT) { snxt = s; } |
---|
1007 | } |
---|
1008 | else { return s; } |
---|
1009 | } |
---|
1010 | } |
---|
1011 | } |
---|
1012 | } |
---|
1013 | else if ( nt3 < -rin*kRadTolerance*secRMin ) |
---|
1014 | { |
---|
1015 | // Within radius of inner cone (real or imaginary) |
---|
1016 | // -> Try 2nd root, with checking intersection is with real cone |
---|
1017 | // -> If check fails, try 1st root, also checking intersection is |
---|
1018 | // on real cone |
---|
1019 | |
---|
1020 | b = nt2/nt1 ; |
---|
1021 | c = nt3/nt1 ; |
---|
1022 | d = b*b - c ; |
---|
1023 | |
---|
1024 | if ( d >= 0 ) // > 0 |
---|
1025 | { |
---|
1026 | s = -b + std::sqrt(d) ; |
---|
1027 | zi = p.z() + s*v.z() ; |
---|
1028 | ri = rMinAv + zi*tanRMin ; |
---|
1029 | |
---|
1030 | if ( ri > 0 ) |
---|
1031 | { |
---|
1032 | if ( (s >= 0) && (std::fabs(zi) <= tolODz) ) // s > 0 |
---|
1033 | { |
---|
1034 | if ( !fPhiFullCone ) |
---|
1035 | { |
---|
1036 | xi = p.x() + s*v.x() ; |
---|
1037 | yi = p.y() + s*v.y() ; |
---|
1038 | cosPsi = (xi*cosCPhi + yi*sinCPhi)/ri ; |
---|
1039 | |
---|
1040 | if (cosPsi >= cosHDPhiOT) { snxt = s; } |
---|
1041 | } |
---|
1042 | else { return s; } |
---|
1043 | } |
---|
1044 | } |
---|
1045 | else |
---|
1046 | { |
---|
1047 | s = -b - std::sqrt(d) ; |
---|
1048 | zi = p.z() + s*v.z() ; |
---|
1049 | ri = rMinAv + zi*tanRMin ; |
---|
1050 | |
---|
1051 | if ( (s >= 0) && (ri > 0) && (std::fabs(zi) <= tolODz) ) // s>0 |
---|
1052 | { |
---|
1053 | if ( !fPhiFullCone ) |
---|
1054 | { |
---|
1055 | xi = p.x() + s*v.x() ; |
---|
1056 | yi = p.y() + s*v.y() ; |
---|
1057 | cosPsi = (xi*cosCPhi + yi*sinCPhi)/ri ; |
---|
1058 | |
---|
1059 | if (cosPsi >= cosHDPhiIT) { snxt = s; } |
---|
1060 | } |
---|
1061 | else { return s; } |
---|
1062 | } |
---|
1063 | } |
---|
1064 | } |
---|
1065 | } |
---|
1066 | else |
---|
1067 | { |
---|
1068 | // Within kRadTol*0.5 of inner cone (real OR imaginary) |
---|
1069 | // ----> Check not travelling through (=>0 to in) |
---|
1070 | // ----> if not: |
---|
1071 | // -2nd root with validity check |
---|
1072 | |
---|
1073 | if ( std::fabs(p.z()) <= tolODz ) |
---|
1074 | { |
---|
1075 | if ( nt2 > 0 ) |
---|
1076 | { |
---|
1077 | // Inside inner real cone, heading outwards, inside z range |
---|
1078 | |
---|
1079 | if ( !fPhiFullCone ) |
---|
1080 | { |
---|
1081 | cosPsi = (p.x()*cosCPhi + p.y()*sinCPhi)/std::sqrt(t3) ; |
---|
1082 | |
---|
1083 | if (cosPsi >= cosHDPhiIT) { return 0.0; } |
---|
1084 | } |
---|
1085 | else { return 0.0; } |
---|
1086 | } |
---|
1087 | else |
---|
1088 | { |
---|
1089 | // Within z extent, but not travelling through |
---|
1090 | // -> 2nd root or kInfinity if 1st root on imaginary cone |
---|
1091 | |
---|
1092 | b = nt2/nt1 ; |
---|
1093 | c = nt3/nt1 ; |
---|
1094 | d = b*b - c ; |
---|
1095 | |
---|
1096 | if ( d >= 0 ) // > 0 |
---|
1097 | { |
---|
1098 | s = -b - std::sqrt(d) ; |
---|
1099 | zi = p.z() + s*v.z() ; |
---|
1100 | ri = rMinAv + zi*tanRMin ; |
---|
1101 | |
---|
1102 | if ( ri > 0 ) // 2nd root |
---|
1103 | { |
---|
1104 | s = -b + std::sqrt(d) ; |
---|
1105 | zi = p.z() + s*v.z() ; |
---|
1106 | |
---|
1107 | if ( (s >= 0) && (std::fabs(zi) <= tolODz) ) // s>0 |
---|
1108 | { |
---|
1109 | if ( !fPhiFullCone ) |
---|
1110 | { |
---|
1111 | xi = p.x() + s*v.x() ; |
---|
1112 | yi = p.y() + s*v.y() ; |
---|
1113 | ri = rMinAv + zi*tanRMin ; |
---|
1114 | cosPsi = (xi*cosCPhi + yi*sinCPhi)/ri ; |
---|
1115 | |
---|
1116 | if ( cosPsi >= cosHDPhiIT ) { snxt = s; } |
---|
1117 | } |
---|
1118 | else { return s; } |
---|
1119 | } |
---|
1120 | } |
---|
1121 | else { return kInfinity; } |
---|
1122 | } |
---|
1123 | } |
---|
1124 | } |
---|
1125 | else // 2nd root |
---|
1126 | { |
---|
1127 | b = nt2/nt1 ; |
---|
1128 | c = nt3/nt1 ; |
---|
1129 | d = b*b - c ; |
---|
1130 | |
---|
1131 | if ( d > 0 ) |
---|
1132 | { |
---|
1133 | s = -b + std::sqrt(d) ; |
---|
1134 | zi = p.z() + s*v.z() ; |
---|
1135 | |
---|
1136 | if ( (s >= 0) && (std::fabs(zi) <= tolODz) ) // s>0 |
---|
1137 | { |
---|
1138 | if ( !fPhiFullCone ) |
---|
1139 | { |
---|
1140 | xi = p.x() + s*v.x(); |
---|
1141 | yi = p.y() + s*v.y(); |
---|
1142 | ri = rMinAv + zi*tanRMin ; |
---|
1143 | cosPsi = (xi*cosCPhi + yi*sinCPhi)/ri; |
---|
1144 | |
---|
1145 | if (cosPsi >= cosHDPhiIT) { snxt = s; } |
---|
1146 | } |
---|
1147 | else { return s; } |
---|
1148 | } |
---|
1149 | } |
---|
1150 | } |
---|
1151 | } |
---|
1152 | } |
---|
1153 | } |
---|
1154 | |
---|
1155 | // Phi segment intersection |
---|
1156 | // |
---|
1157 | // o Tolerant of points inside phi planes by up to kCarTolerance*0.5 |
---|
1158 | // |
---|
1159 | // o NOTE: Large duplication of code between sphi & ephi checks |
---|
1160 | // -> only diffs: sphi -> ephi, Comp -> -Comp and half-plane |
---|
1161 | // intersection check <=0 -> >=0 |
---|
1162 | // -> Should use some form of loop Construct |
---|
1163 | |
---|
1164 | if ( !fPhiFullCone ) |
---|
1165 | { |
---|
1166 | // First phi surface (starting phi) |
---|
1167 | |
---|
1168 | Comp = v.x()*sinSPhi - v.y()*cosSPhi ; |
---|
1169 | |
---|
1170 | if ( Comp < 0 ) // Component in outwards normal dirn |
---|
1171 | { |
---|
1172 | Dist = (p.y()*cosSPhi - p.x()*sinSPhi) ; |
---|
1173 | |
---|
1174 | if (Dist < halfCarTolerance) |
---|
1175 | { |
---|
1176 | s = Dist/Comp ; |
---|
1177 | |
---|
1178 | if ( s < snxt ) |
---|
1179 | { |
---|
1180 | if ( s < 0 ) { s = 0.0; } |
---|
1181 | |
---|
1182 | zi = p.z() + s*v.z() ; |
---|
1183 | |
---|
1184 | if ( std::fabs(zi) <= tolODz ) |
---|
1185 | { |
---|
1186 | xi = p.x() + s*v.x() ; |
---|
1187 | yi = p.y() + s*v.y() ; |
---|
1188 | rhoi2 = xi*xi + yi*yi ; |
---|
1189 | tolORMin2 = (rMinOAv + zi*tanRMin)*(rMinOAv + zi*tanRMin) ; |
---|
1190 | tolORMax2 = (rMaxOAv + zi*tanRMax)*(rMaxOAv + zi*tanRMax) ; |
---|
1191 | |
---|
1192 | if ( (rhoi2 >= tolORMin2) && (rhoi2 <= tolORMax2) ) |
---|
1193 | { |
---|
1194 | // z and r intersections good - check intersecting with |
---|
1195 | // correct half-plane |
---|
1196 | |
---|
1197 | if ((yi*cosCPhi - xi*sinCPhi) <= 0 ) { snxt = s; } |
---|
1198 | } |
---|
1199 | } |
---|
1200 | } |
---|
1201 | } |
---|
1202 | } |
---|
1203 | |
---|
1204 | // Second phi surface (Ending phi) |
---|
1205 | |
---|
1206 | Comp = -(v.x()*sinEPhi - v.y()*cosEPhi) ; |
---|
1207 | |
---|
1208 | if ( Comp < 0 ) // Component in outwards normal dirn |
---|
1209 | { |
---|
1210 | Dist = -(p.y()*cosEPhi - p.x()*sinEPhi) ; |
---|
1211 | if (Dist < halfCarTolerance) |
---|
1212 | { |
---|
1213 | s = Dist/Comp ; |
---|
1214 | |
---|
1215 | if ( s < snxt ) |
---|
1216 | { |
---|
1217 | if ( s < 0 ) { s = 0.0; } |
---|
1218 | |
---|
1219 | zi = p.z() + s*v.z() ; |
---|
1220 | |
---|
1221 | if (std::fabs(zi) <= tolODz) |
---|
1222 | { |
---|
1223 | xi = p.x() + s*v.x() ; |
---|
1224 | yi = p.y() + s*v.y() ; |
---|
1225 | rhoi2 = xi*xi + yi*yi ; |
---|
1226 | tolORMin2 = (rMinOAv + zi*tanRMin)*(rMinOAv + zi*tanRMin) ; |
---|
1227 | tolORMax2 = (rMaxOAv + zi*tanRMax)*(rMaxOAv + zi*tanRMax) ; |
---|
1228 | |
---|
1229 | if ( (rhoi2 >= tolORMin2) && (rhoi2 <= tolORMax2) ) |
---|
1230 | { |
---|
1231 | // z and r intersections good - check intersecting with |
---|
1232 | // correct half-plane |
---|
1233 | |
---|
1234 | if ( (yi*cosCPhi - xi*sinCPhi) >= 0.0 ) { snxt = s; } |
---|
1235 | } |
---|
1236 | } |
---|
1237 | } |
---|
1238 | } |
---|
1239 | } |
---|
1240 | } |
---|
1241 | if (snxt < halfCarTolerance) { snxt = 0.; } |
---|
1242 | |
---|
1243 | return snxt ; |
---|
1244 | } |
---|
1245 | |
---|
1246 | ////////////////////////////////////////////////////////////////////////////// |
---|
1247 | // |
---|
1248 | // Calculate distance (<= actual) to closest surface of shape from outside |
---|
1249 | // - Calculate distance to z, radial planes |
---|
1250 | // - Only to phi planes if outside phi extent |
---|
1251 | // - Return 0 if point inside |
---|
1252 | |
---|
1253 | G4double G4Cons::DistanceToIn(const G4ThreeVector& p) const |
---|
1254 | { |
---|
1255 | G4double safe=0.0, rho, safeR1, safeR2, safeZ, safePhi, cosPsi ; |
---|
1256 | G4double tanRMin, secRMin, pRMin ; |
---|
1257 | G4double tanRMax, secRMax, pRMax ; |
---|
1258 | |
---|
1259 | rho = std::sqrt(p.x()*p.x() + p.y()*p.y()) ; |
---|
1260 | safeZ = std::fabs(p.z()) - fDz ; |
---|
1261 | |
---|
1262 | if ( fRmin1 || fRmin2 ) |
---|
1263 | { |
---|
1264 | tanRMin = (fRmin2 - fRmin1)*0.5/fDz ; |
---|
1265 | secRMin = std::sqrt(1.0 + tanRMin*tanRMin) ; |
---|
1266 | pRMin = tanRMin*p.z() + (fRmin1 + fRmin2)*0.5 ; |
---|
1267 | safeR1 = (pRMin - rho)/secRMin ; |
---|
1268 | |
---|
1269 | tanRMax = (fRmax2 - fRmax1)*0.5/fDz ; |
---|
1270 | secRMax = std::sqrt(1.0 + tanRMax*tanRMax) ; |
---|
1271 | pRMax = tanRMax*p.z() + (fRmax1 + fRmax2)*0.5 ; |
---|
1272 | safeR2 = (rho - pRMax)/secRMax ; |
---|
1273 | |
---|
1274 | if ( safeR1 > safeR2) { safe = safeR1; } |
---|
1275 | else { safe = safeR2; } |
---|
1276 | } |
---|
1277 | else |
---|
1278 | { |
---|
1279 | tanRMax = (fRmax2 - fRmax1)*0.5/fDz ; |
---|
1280 | secRMax = std::sqrt(1.0 + tanRMax*tanRMax) ; |
---|
1281 | pRMax = tanRMax*p.z() + (fRmax1 + fRmax2)*0.5 ; |
---|
1282 | safe = (rho - pRMax)/secRMax ; |
---|
1283 | } |
---|
1284 | if ( safeZ > safe ) { safe = safeZ; } |
---|
1285 | |
---|
1286 | if ( !fPhiFullCone && rho ) |
---|
1287 | { |
---|
1288 | // Psi=angle from central phi to point |
---|
1289 | |
---|
1290 | cosPsi = (p.x()*cosCPhi + p.y()*sinCPhi)/rho ; |
---|
1291 | |
---|
1292 | if ( cosPsi < std::cos(fDPhi*0.5) ) // Point lies outside phi range |
---|
1293 | { |
---|
1294 | if ( (p.y()*cosCPhi - p.x()*sinCPhi) <= 0.0 ) |
---|
1295 | { |
---|
1296 | safePhi = std::fabs(p.x()*std::sin(fSPhi)-p.y()*std::cos(fSPhi)); |
---|
1297 | } |
---|
1298 | else |
---|
1299 | { |
---|
1300 | safePhi = std::fabs(p.x()*sinEPhi-p.y()*cosEPhi); |
---|
1301 | } |
---|
1302 | if ( safePhi > safe ) { safe = safePhi; } |
---|
1303 | } |
---|
1304 | } |
---|
1305 | if ( safe < 0.0 ) { safe = 0.0; } |
---|
1306 | |
---|
1307 | return safe ; |
---|
1308 | } |
---|
1309 | |
---|
1310 | /////////////////////////////////////////////////////////////// |
---|
1311 | // |
---|
1312 | // Calculate distance to surface of shape from 'inside', allowing for tolerance |
---|
1313 | // - Only Calc rmax intersection if no valid rmin intersection |
---|
1314 | |
---|
1315 | G4double G4Cons::DistanceToOut( const G4ThreeVector& p, |
---|
1316 | const G4ThreeVector& v, |
---|
1317 | const G4bool calcNorm, |
---|
1318 | G4bool *validNorm, |
---|
1319 | G4ThreeVector *n) const |
---|
1320 | { |
---|
1321 | ESide side = kNull, sider = kNull, sidephi = kNull; |
---|
1322 | |
---|
1323 | static const G4double halfCarTolerance=kCarTolerance*0.5; |
---|
1324 | static const G4double halfRadTolerance=kRadTolerance*0.5; |
---|
1325 | static const G4double halfAngTolerance=kAngTolerance*0.5; |
---|
1326 | |
---|
1327 | G4double snxt,sr,sphi,pdist ; |
---|
1328 | |
---|
1329 | G4double tanRMax, secRMax, rMaxAv ; // Data for outer cone |
---|
1330 | G4double tanRMin, secRMin, rMinAv ; // Data for inner cone |
---|
1331 | |
---|
1332 | G4double t1, t2, t3, rout, rin, nt1, nt2, nt3 ; |
---|
1333 | G4double b, c, d, sr2, sr3 ; |
---|
1334 | |
---|
1335 | // Vars for intersection within tolerance |
---|
1336 | |
---|
1337 | ESide sidetol ; |
---|
1338 | G4double slentol = kInfinity ; |
---|
1339 | |
---|
1340 | // Vars for phi intersection: |
---|
1341 | |
---|
1342 | G4double pDistS, compS, pDistE, compE, sphi2, xi, yi, risec, vphi ; |
---|
1343 | G4double zi, ri, deltaRoi2 ; |
---|
1344 | |
---|
1345 | // Z plane intersection |
---|
1346 | |
---|
1347 | if ( v.z() > 0.0 ) |
---|
1348 | { |
---|
1349 | pdist = fDz - p.z() ; |
---|
1350 | |
---|
1351 | if (pdist > halfCarTolerance) |
---|
1352 | { |
---|
1353 | snxt = pdist/v.z() ; |
---|
1354 | side = kPZ ; |
---|
1355 | } |
---|
1356 | else |
---|
1357 | { |
---|
1358 | if (calcNorm) |
---|
1359 | { |
---|
1360 | *n = G4ThreeVector(0,0,1) ; |
---|
1361 | *validNorm = true ; |
---|
1362 | } |
---|
1363 | return snxt = 0.0; |
---|
1364 | } |
---|
1365 | } |
---|
1366 | else if ( v.z() < 0.0 ) |
---|
1367 | { |
---|
1368 | pdist = fDz + p.z() ; |
---|
1369 | |
---|
1370 | if ( pdist > halfCarTolerance) |
---|
1371 | { |
---|
1372 | snxt = -pdist/v.z() ; |
---|
1373 | side = kMZ ; |
---|
1374 | } |
---|
1375 | else |
---|
1376 | { |
---|
1377 | if ( calcNorm ) |
---|
1378 | { |
---|
1379 | *n = G4ThreeVector(0,0,-1) ; |
---|
1380 | *validNorm = true ; |
---|
1381 | } |
---|
1382 | return snxt = 0.0 ; |
---|
1383 | } |
---|
1384 | } |
---|
1385 | else // Travel perpendicular to z axis |
---|
1386 | { |
---|
1387 | snxt = kInfinity ; |
---|
1388 | side = kNull ; |
---|
1389 | } |
---|
1390 | |
---|
1391 | // Radial Intersections |
---|
1392 | // |
---|
1393 | // Intersection with outer cone (possible return) and |
---|
1394 | // inner cone (must also check phi) |
---|
1395 | // |
---|
1396 | // Intersection point (xi,yi,zi) on line x=p.x+t*v.x etc. |
---|
1397 | // |
---|
1398 | // Intersects with x^2+y^2=(a*z+b)^2 |
---|
1399 | // |
---|
1400 | // where a=tanRMax or tanRMin |
---|
1401 | // b=rMaxAv or rMinAv |
---|
1402 | // |
---|
1403 | // (vx^2+vy^2-(a*vz)^2)t^2+2t(pxvx+pyvy-a*vz(a*pz+b))+px^2+py^2-(a*pz+b)^2=0 ; |
---|
1404 | // t1 t2 t3 |
---|
1405 | // |
---|
1406 | // \--------u-------/ \-----------v----------/ \---------w--------/ |
---|
1407 | |
---|
1408 | tanRMax = (fRmax2 - fRmax1)*0.5/fDz ; |
---|
1409 | secRMax = std::sqrt(1.0 + tanRMax*tanRMax) ; |
---|
1410 | rMaxAv = (fRmax1 + fRmax2)*0.5 ; |
---|
1411 | |
---|
1412 | |
---|
1413 | t1 = 1.0 - v.z()*v.z() ; // since v normalised |
---|
1414 | t2 = p.x()*v.x() + p.y()*v.y() ; |
---|
1415 | t3 = p.x()*p.x() + p.y()*p.y() ; |
---|
1416 | rout = tanRMax*p.z() + rMaxAv ; |
---|
1417 | |
---|
1418 | nt1 = t1 - (tanRMax*v.z())*(tanRMax*v.z()) ; |
---|
1419 | nt2 = t2 - tanRMax*v.z()*rout ; |
---|
1420 | nt3 = t3 - rout*rout ; |
---|
1421 | |
---|
1422 | if (v.z() > 0.0) |
---|
1423 | { |
---|
1424 | deltaRoi2 = snxt*snxt*t1 + 2*snxt*t2 + t3 |
---|
1425 | - fRmax2*(fRmax2 + kRadTolerance*secRMax); |
---|
1426 | } |
---|
1427 | else if ( v.z() < 0.0 ) |
---|
1428 | { |
---|
1429 | deltaRoi2 = snxt*snxt*t1 + 2*snxt*t2 + t3 |
---|
1430 | - fRmax1*(fRmax1 + kRadTolerance*secRMax); |
---|
1431 | } |
---|
1432 | else |
---|
1433 | { |
---|
1434 | deltaRoi2 = 1.0; |
---|
1435 | } |
---|
1436 | |
---|
1437 | if ( nt1 && (deltaRoi2 > 0.0) ) |
---|
1438 | { |
---|
1439 | // Equation quadratic => 2 roots : second root must be leaving |
---|
1440 | |
---|
1441 | b = nt2/nt1 ; |
---|
1442 | c = nt3/nt1 ; |
---|
1443 | d = b*b - c ; |
---|
1444 | |
---|
1445 | if ( d >= 0 ) |
---|
1446 | { |
---|
1447 | // Check if on outer cone & heading outwards |
---|
1448 | // NOTE: Should use rho-rout>-kRadTolerance*0.5 |
---|
1449 | |
---|
1450 | if (nt3 > -halfRadTolerance && nt2 >= 0 ) |
---|
1451 | { |
---|
1452 | if (calcNorm) |
---|
1453 | { |
---|
1454 | risec = std::sqrt(t3)*secRMax ; |
---|
1455 | *validNorm = true ; |
---|
1456 | *n = G4ThreeVector(p.x()/risec,p.y()/risec,-tanRMax/secRMax); |
---|
1457 | } |
---|
1458 | return snxt=0 ; |
---|
1459 | } |
---|
1460 | else |
---|
1461 | { |
---|
1462 | sider = kRMax ; |
---|
1463 | sr = -b - std::sqrt(d) ; // was +srqrt(d), vmg 28.04.99 |
---|
1464 | zi = p.z() + sr*v.z() ; |
---|
1465 | ri = tanRMax*zi + rMaxAv ; |
---|
1466 | |
---|
1467 | if ((ri >= 0) && (-halfRadTolerance <= sr) && (sr <= halfRadTolerance)) |
---|
1468 | { |
---|
1469 | // An intersection within the tolerance |
---|
1470 | // we will Store it in case it is good - |
---|
1471 | // |
---|
1472 | slentol = sr ; |
---|
1473 | sidetol = kRMax ; |
---|
1474 | } |
---|
1475 | if ( (ri < 0) || (sr < halfRadTolerance) ) |
---|
1476 | { |
---|
1477 | // Safety: if both roots -ve ensure that sr cannot `win' |
---|
1478 | // distance to out |
---|
1479 | |
---|
1480 | sr2 = -b + std::sqrt(d) ; |
---|
1481 | zi = p.z() + sr2*v.z() ; |
---|
1482 | ri = tanRMax*zi + rMaxAv ; |
---|
1483 | |
---|
1484 | if ((ri >= 0) && (sr2 > halfRadTolerance)) |
---|
1485 | { |
---|
1486 | sr = sr2; |
---|
1487 | } |
---|
1488 | else |
---|
1489 | { |
---|
1490 | sr = kInfinity ; |
---|
1491 | |
---|
1492 | if( (-halfRadTolerance <= sr2) && ( sr2 <= halfRadTolerance) ) |
---|
1493 | { |
---|
1494 | // An intersection within the tolerance. |
---|
1495 | // Storing it in case it is good. |
---|
1496 | |
---|
1497 | slentol = sr2 ; |
---|
1498 | sidetol = kRMax ; |
---|
1499 | } |
---|
1500 | } |
---|
1501 | } |
---|
1502 | } |
---|
1503 | } |
---|
1504 | else |
---|
1505 | { |
---|
1506 | // No intersection with outer cone & not parallel |
---|
1507 | // -> already outside, no intersection |
---|
1508 | |
---|
1509 | if ( calcNorm ) |
---|
1510 | { |
---|
1511 | risec = std::sqrt(t3)*secRMax; |
---|
1512 | *validNorm = true; |
---|
1513 | *n = G4ThreeVector(p.x()/risec,p.y()/risec,-tanRMax/secRMax); |
---|
1514 | } |
---|
1515 | return snxt = 0.0 ; |
---|
1516 | } |
---|
1517 | } |
---|
1518 | else if ( nt2 && (deltaRoi2 > 0.0) ) |
---|
1519 | { |
---|
1520 | // Linear case (only one intersection) => point outside outer cone |
---|
1521 | |
---|
1522 | if ( calcNorm ) |
---|
1523 | { |
---|
1524 | risec = std::sqrt(t3)*secRMax; |
---|
1525 | *validNorm = true; |
---|
1526 | *n = G4ThreeVector(p.x()/risec,p.y()/risec,-tanRMax/secRMax); |
---|
1527 | } |
---|
1528 | return snxt = 0.0 ; |
---|
1529 | } |
---|
1530 | else |
---|
1531 | { |
---|
1532 | // No intersection -> parallel to outer cone |
---|
1533 | // => Z or inner cone intersection |
---|
1534 | |
---|
1535 | sr = kInfinity ; |
---|
1536 | } |
---|
1537 | |
---|
1538 | // Check possible intersection within tolerance |
---|
1539 | |
---|
1540 | if ( slentol <= halfCarTolerance ) |
---|
1541 | { |
---|
1542 | // An intersection within the tolerance was found. |
---|
1543 | // We must accept it only if the momentum points outwards. |
---|
1544 | // |
---|
1545 | // G4ThreeVector ptTol ; // The point of the intersection |
---|
1546 | // ptTol= p + slentol*v ; |
---|
1547 | // ri=tanRMax*zi+rMaxAv ; |
---|
1548 | // |
---|
1549 | // Calculate a normal vector, as below |
---|
1550 | |
---|
1551 | xi = p.x() + slentol*v.x(); |
---|
1552 | yi = p.y() + slentol*v.y(); |
---|
1553 | risec = std::sqrt(xi*xi + yi*yi)*secRMax; |
---|
1554 | G4ThreeVector Normal = G4ThreeVector(xi/risec,yi/risec,-tanRMax/secRMax); |
---|
1555 | |
---|
1556 | if ( Normal.dot(v) > 0 ) // We will leave the Cone immediatelly |
---|
1557 | { |
---|
1558 | if ( calcNorm ) |
---|
1559 | { |
---|
1560 | *n = Normal.unit() ; |
---|
1561 | *validNorm = true ; |
---|
1562 | } |
---|
1563 | return snxt = 0.0 ; |
---|
1564 | } |
---|
1565 | else // On the surface, but not heading out so we ignore this intersection |
---|
1566 | { // (as it is within tolerance). |
---|
1567 | slentol = kInfinity ; |
---|
1568 | } |
---|
1569 | } |
---|
1570 | |
---|
1571 | // Inner Cone intersection |
---|
1572 | |
---|
1573 | if ( fRmin1 || fRmin2 ) |
---|
1574 | { |
---|
1575 | tanRMin = (fRmin2 - fRmin1)*0.5/fDz ; |
---|
1576 | nt1 = t1 - (tanRMin*v.z())*(tanRMin*v.z()) ; |
---|
1577 | |
---|
1578 | if ( nt1 ) |
---|
1579 | { |
---|
1580 | secRMin = std::sqrt(1.0 + tanRMin*tanRMin) ; |
---|
1581 | rMinAv = (fRmin1 + fRmin2)*0.5 ; |
---|
1582 | rin = tanRMin*p.z() + rMinAv ; |
---|
1583 | nt2 = t2 - tanRMin*v.z()*rin ; |
---|
1584 | nt3 = t3 - rin*rin ; |
---|
1585 | |
---|
1586 | // Equation quadratic => 2 roots : first root must be leaving |
---|
1587 | |
---|
1588 | b = nt2/nt1 ; |
---|
1589 | c = nt3/nt1 ; |
---|
1590 | d = b*b - c ; |
---|
1591 | |
---|
1592 | if ( d >= 0.0 ) |
---|
1593 | { |
---|
1594 | // NOTE: should be rho-rin<kRadTolerance*0.5, |
---|
1595 | // but using squared versions for efficiency |
---|
1596 | |
---|
1597 | if (nt3 < kRadTolerance*(rin + kRadTolerance*0.25)) |
---|
1598 | { |
---|
1599 | if ( nt2 < 0.0 ) |
---|
1600 | { |
---|
1601 | if (calcNorm) { *validNorm = false; } |
---|
1602 | return snxt = 0.0; |
---|
1603 | } |
---|
1604 | } |
---|
1605 | else |
---|
1606 | { |
---|
1607 | sr2 = -b - std::sqrt(d) ; |
---|
1608 | zi = p.z() + sr2*v.z() ; |
---|
1609 | ri = tanRMin*zi + rMinAv ; |
---|
1610 | |
---|
1611 | if( (ri>=0.0)&&(-halfRadTolerance<=sr2)&&(sr2<=halfRadTolerance) ) |
---|
1612 | { |
---|
1613 | // An intersection within the tolerance |
---|
1614 | // storing it in case it is good. |
---|
1615 | |
---|
1616 | slentol = sr2 ; |
---|
1617 | sidetol = kRMax ; |
---|
1618 | } |
---|
1619 | if( (ri<0) || (sr2 < halfRadTolerance) ) |
---|
1620 | { |
---|
1621 | sr3 = -b + std::sqrt(d) ; |
---|
1622 | |
---|
1623 | // Safety: if both roots -ve ensure that sr cannot `win' |
---|
1624 | // distancetoout |
---|
1625 | |
---|
1626 | if ( sr3 > halfRadTolerance ) |
---|
1627 | { |
---|
1628 | if( sr3 < sr ) |
---|
1629 | { |
---|
1630 | zi = p.z() + sr3*v.z() ; |
---|
1631 | ri = tanRMin*zi + rMinAv ; |
---|
1632 | |
---|
1633 | if ( ri >= 0.0 ) |
---|
1634 | { |
---|
1635 | sr=sr3 ; |
---|
1636 | sider=kRMin ; |
---|
1637 | } |
---|
1638 | } |
---|
1639 | } |
---|
1640 | else if ( sr3 > -halfRadTolerance ) |
---|
1641 | { |
---|
1642 | // Intersection in tolerance. Store to check if it's good |
---|
1643 | |
---|
1644 | slentol = sr3 ; |
---|
1645 | sidetol = kRMin ; |
---|
1646 | } |
---|
1647 | } |
---|
1648 | else if ( (sr2 < sr) && (sr2 > halfCarTolerance) ) |
---|
1649 | { |
---|
1650 | sr = sr2 ; |
---|
1651 | sider = kRMin ; |
---|
1652 | } |
---|
1653 | else if (sr2 > -halfCarTolerance) |
---|
1654 | { |
---|
1655 | // Intersection in tolerance. Store to check if it's good |
---|
1656 | |
---|
1657 | slentol = sr2 ; |
---|
1658 | sidetol = kRMin ; |
---|
1659 | } |
---|
1660 | if( slentol <= halfCarTolerance ) |
---|
1661 | { |
---|
1662 | // An intersection within the tolerance was found. |
---|
1663 | // We must accept it only if the momentum points outwards. |
---|
1664 | |
---|
1665 | G4ThreeVector Normal ; |
---|
1666 | |
---|
1667 | // Calculate a normal vector, as below |
---|
1668 | |
---|
1669 | xi = p.x() + slentol*v.x() ; |
---|
1670 | yi = p.y() + slentol*v.y() ; |
---|
1671 | risec = std::sqrt(xi*xi + yi*yi)*secRMin ; |
---|
1672 | Normal = G4ThreeVector(xi/risec,yi/risec,-tanRMin/secRMin) ; |
---|
1673 | |
---|
1674 | if( Normal.dot(v) > 0 ) |
---|
1675 | { |
---|
1676 | // We will leave the cone immediately |
---|
1677 | |
---|
1678 | if( calcNorm ) |
---|
1679 | { |
---|
1680 | *n = Normal.unit() ; |
---|
1681 | *validNorm = true ; |
---|
1682 | } |
---|
1683 | return snxt = 0.0 ; |
---|
1684 | } |
---|
1685 | else |
---|
1686 | { |
---|
1687 | // On the surface, but not heading out so we ignore this |
---|
1688 | // intersection (as it is within tolerance). |
---|
1689 | |
---|
1690 | slentol = kInfinity ; |
---|
1691 | } |
---|
1692 | } |
---|
1693 | } |
---|
1694 | } |
---|
1695 | } |
---|
1696 | } |
---|
1697 | |
---|
1698 | // Linear case => point outside inner cone ---> outer cone intersect |
---|
1699 | // |
---|
1700 | // Phi Intersection |
---|
1701 | |
---|
1702 | if ( !fPhiFullCone ) |
---|
1703 | { |
---|
1704 | // add angle calculation with correction |
---|
1705 | // of the difference in domain of atan2 and Sphi |
---|
1706 | |
---|
1707 | vphi = std::atan2(v.y(),v.x()) ; |
---|
1708 | |
---|
1709 | if ( vphi < fSPhi - halfAngTolerance ) { vphi += twopi; } |
---|
1710 | else if ( vphi > fSPhi + fDPhi + halfAngTolerance ) { vphi -= twopi; } |
---|
1711 | |
---|
1712 | if ( p.x() || p.y() ) // Check if on z axis (rho not needed later) |
---|
1713 | { |
---|
1714 | // pDist -ve when inside |
---|
1715 | |
---|
1716 | pDistS = p.x()*sinSPhi - p.y()*cosSPhi ; |
---|
1717 | pDistE = -p.x()*sinEPhi + p.y()*cosEPhi ; |
---|
1718 | |
---|
1719 | // Comp -ve when in direction of outwards normal |
---|
1720 | |
---|
1721 | compS = -sinSPhi*v.x() + cosSPhi*v.y() ; |
---|
1722 | compE = sinEPhi*v.x() - cosEPhi*v.y() ; |
---|
1723 | |
---|
1724 | sidephi = kNull ; |
---|
1725 | |
---|
1726 | if( ( (fDPhi <= pi) && ( (pDistS <= halfCarTolerance) |
---|
1727 | && (pDistE <= halfCarTolerance) ) ) |
---|
1728 | || ( (fDPhi > pi) && !((pDistS > halfCarTolerance) |
---|
1729 | && (pDistE > halfCarTolerance) ) ) ) |
---|
1730 | { |
---|
1731 | // Inside both phi *full* planes |
---|
1732 | if ( compS < 0 ) |
---|
1733 | { |
---|
1734 | sphi = pDistS/compS ; |
---|
1735 | if (sphi >= -halfCarTolerance) |
---|
1736 | { |
---|
1737 | xi = p.x() + sphi*v.x() ; |
---|
1738 | yi = p.y() + sphi*v.y() ; |
---|
1739 | |
---|
1740 | // Check intersecting with correct half-plane |
---|
1741 | // (if not -> no intersect) |
---|
1742 | // |
---|
1743 | if ( (std::abs(xi)<=kCarTolerance) |
---|
1744 | && (std::abs(yi)<=kCarTolerance) ) |
---|
1745 | { |
---|
1746 | sidephi= kSPhi; |
---|
1747 | if ( ( fSPhi-halfAngTolerance <= vphi ) |
---|
1748 | && ( fSPhi+fDPhi+halfAngTolerance >=vphi ) ) |
---|
1749 | { |
---|
1750 | sphi = kInfinity; |
---|
1751 | } |
---|
1752 | } |
---|
1753 | else |
---|
1754 | if ( (yi*cosCPhi-xi*sinCPhi)>=0 ) |
---|
1755 | { |
---|
1756 | sphi = kInfinity ; |
---|
1757 | } |
---|
1758 | else |
---|
1759 | { |
---|
1760 | sidephi = kSPhi ; |
---|
1761 | if ( pDistS > -halfCarTolerance ) |
---|
1762 | { |
---|
1763 | sphi = 0.0 ; // Leave by sphi immediately |
---|
1764 | } |
---|
1765 | } |
---|
1766 | } |
---|
1767 | else |
---|
1768 | { |
---|
1769 | sphi = kInfinity ; |
---|
1770 | } |
---|
1771 | } |
---|
1772 | else |
---|
1773 | { |
---|
1774 | sphi = kInfinity ; |
---|
1775 | } |
---|
1776 | |
---|
1777 | if ( compE < 0 ) |
---|
1778 | { |
---|
1779 | sphi2 = pDistE/compE ; |
---|
1780 | |
---|
1781 | // Only check further if < starting phi intersection |
---|
1782 | // |
---|
1783 | if ( (sphi2 > -halfCarTolerance) && (sphi2 < sphi) ) |
---|
1784 | { |
---|
1785 | xi = p.x() + sphi2*v.x() ; |
---|
1786 | yi = p.y() + sphi2*v.y() ; |
---|
1787 | |
---|
1788 | // Check intersecting with correct half-plane |
---|
1789 | |
---|
1790 | if ( (std::abs(xi)<=kCarTolerance) |
---|
1791 | && (std::abs(yi)<=kCarTolerance) ) |
---|
1792 | { |
---|
1793 | // Leaving via ending phi |
---|
1794 | |
---|
1795 | if(!( (fSPhi-halfAngTolerance <= vphi) |
---|
1796 | && (fSPhi+fDPhi+halfAngTolerance >= vphi) ) ) |
---|
1797 | { |
---|
1798 | sidephi = kEPhi ; |
---|
1799 | if ( pDistE <= -halfCarTolerance ) { sphi = sphi2; } |
---|
1800 | else { sphi = 0.0; } |
---|
1801 | } |
---|
1802 | } |
---|
1803 | else // Check intersecting with correct half-plane |
---|
1804 | if ( yi*cosCPhi-xi*sinCPhi >= 0 ) |
---|
1805 | { |
---|
1806 | // Leaving via ending phi |
---|
1807 | |
---|
1808 | sidephi = kEPhi ; |
---|
1809 | if ( pDistE <= -halfCarTolerance ) { sphi = sphi2; } |
---|
1810 | else { sphi = 0.0; } |
---|
1811 | } |
---|
1812 | } |
---|
1813 | } |
---|
1814 | } |
---|
1815 | else |
---|
1816 | { |
---|
1817 | sphi = kInfinity ; |
---|
1818 | } |
---|
1819 | } |
---|
1820 | else |
---|
1821 | { |
---|
1822 | // On z axis + travel not || to z axis -> if phi of vector direction |
---|
1823 | // within phi of shape, Step limited by rmax, else Step =0 |
---|
1824 | |
---|
1825 | if ( (fSPhi-halfAngTolerance <= vphi) |
---|
1826 | && (vphi <= fSPhi+fDPhi+halfAngTolerance) ) |
---|
1827 | { |
---|
1828 | sphi = kInfinity ; |
---|
1829 | } |
---|
1830 | else |
---|
1831 | { |
---|
1832 | sidephi = kSPhi ; // arbitrary |
---|
1833 | sphi = 0.0 ; |
---|
1834 | } |
---|
1835 | } |
---|
1836 | if ( sphi < snxt ) // Order intersecttions |
---|
1837 | { |
---|
1838 | snxt=sphi ; |
---|
1839 | side=sidephi ; |
---|
1840 | } |
---|
1841 | } |
---|
1842 | if ( sr < snxt ) // Order intersections |
---|
1843 | { |
---|
1844 | snxt = sr ; |
---|
1845 | side = sider ; |
---|
1846 | } |
---|
1847 | if (calcNorm) |
---|
1848 | { |
---|
1849 | switch(side) |
---|
1850 | { // Note: returned vector not normalised |
---|
1851 | case kRMax: // (divide by frmax for unit vector) |
---|
1852 | xi = p.x() + snxt*v.x() ; |
---|
1853 | yi = p.y() + snxt*v.y() ; |
---|
1854 | risec = std::sqrt(xi*xi + yi*yi)*secRMax ; |
---|
1855 | *n = G4ThreeVector(xi/risec,yi/risec,-tanRMax/secRMax) ; |
---|
1856 | *validNorm = true ; |
---|
1857 | break ; |
---|
1858 | case kRMin: |
---|
1859 | *validNorm = false ; // Rmin is inconvex |
---|
1860 | break ; |
---|
1861 | case kSPhi: |
---|
1862 | if ( fDPhi <= pi ) |
---|
1863 | { |
---|
1864 | *n = G4ThreeVector(sinSPhi, -cosSPhi, 0); |
---|
1865 | *validNorm = true ; |
---|
1866 | } |
---|
1867 | else |
---|
1868 | { |
---|
1869 | *validNorm = false ; |
---|
1870 | } |
---|
1871 | break ; |
---|
1872 | case kEPhi: |
---|
1873 | if ( fDPhi <= pi ) |
---|
1874 | { |
---|
1875 | *n = G4ThreeVector(-sinEPhi, cosEPhi, 0); |
---|
1876 | *validNorm = true ; |
---|
1877 | } |
---|
1878 | else |
---|
1879 | { |
---|
1880 | *validNorm = false ; |
---|
1881 | } |
---|
1882 | break ; |
---|
1883 | case kPZ: |
---|
1884 | *n = G4ThreeVector(0,0,1) ; |
---|
1885 | *validNorm = true ; |
---|
1886 | break ; |
---|
1887 | case kMZ: |
---|
1888 | *n = G4ThreeVector(0,0,-1) ; |
---|
1889 | *validNorm = true ; |
---|
1890 | break ; |
---|
1891 | default: |
---|
1892 | G4cout.precision(16) ; |
---|
1893 | G4cout << G4endl ; |
---|
1894 | DumpInfo(); |
---|
1895 | G4cout << "Position:" << G4endl << G4endl ; |
---|
1896 | G4cout << "p.x() = " << p.x()/mm << " mm" << G4endl ; |
---|
1897 | G4cout << "p.y() = " << p.y()/mm << " mm" << G4endl ; |
---|
1898 | G4cout << "p.z() = " << p.z()/mm << " mm" << G4endl << G4endl ; |
---|
1899 | G4cout << "pho at z = " << std::sqrt( p.x()*p.x()+p.y()*p.y() )/mm |
---|
1900 | << " mm" << G4endl << G4endl ; |
---|
1901 | if( p.x() != 0. || p.x() != 0.) |
---|
1902 | { |
---|
1903 | G4cout << "point phi = " << std::atan2(p.y(),p.x())/degree |
---|
1904 | << " degree" << G4endl << G4endl ; |
---|
1905 | } |
---|
1906 | G4cout << "Direction:" << G4endl << G4endl ; |
---|
1907 | G4cout << "v.x() = " << v.x() << G4endl ; |
---|
1908 | G4cout << "v.y() = " << v.y() << G4endl ; |
---|
1909 | G4cout << "v.z() = " << v.z() << G4endl<< G4endl ; |
---|
1910 | G4cout << "Proposed distance :" << G4endl<< G4endl ; |
---|
1911 | G4cout << "snxt = " << snxt/mm << " mm" << G4endl << G4endl ; |
---|
1912 | G4Exception("G4Cons::DistanceToOut(p,v,..)","Notification",JustWarning, |
---|
1913 | "Undefined side for valid surface normal to solid.") ; |
---|
1914 | break ; |
---|
1915 | } |
---|
1916 | } |
---|
1917 | if (snxt < halfCarTolerance) { snxt = 0.; } |
---|
1918 | |
---|
1919 | return snxt ; |
---|
1920 | } |
---|
1921 | |
---|
1922 | ////////////////////////////////////////////////////////////////// |
---|
1923 | // |
---|
1924 | // Calculate distance (<=actual) to closest surface of shape from inside |
---|
1925 | |
---|
1926 | G4double G4Cons::DistanceToOut(const G4ThreeVector& p) const |
---|
1927 | { |
---|
1928 | G4double safe=0.0, rho, safeR1, safeR2, safeZ, safePhi; |
---|
1929 | G4double tanRMin, secRMin, pRMin; |
---|
1930 | G4double tanRMax, secRMax, pRMax; |
---|
1931 | |
---|
1932 | #ifdef G4CSGDEBUG |
---|
1933 | if( Inside(p) == kOutside ) |
---|
1934 | { |
---|
1935 | G4cout.precision(16) ; |
---|
1936 | G4cout << G4endl ; |
---|
1937 | DumpInfo(); |
---|
1938 | G4cout << "Position:" << G4endl << G4endl ; |
---|
1939 | G4cout << "p.x() = " << p.x()/mm << " mm" << G4endl ; |
---|
1940 | G4cout << "p.y() = " << p.y()/mm << " mm" << G4endl ; |
---|
1941 | G4cout << "p.z() = " << p.z()/mm << " mm" << G4endl << G4endl ; |
---|
1942 | G4cout << "pho at z = " << std::sqrt( p.x()*p.x()+p.y()*p.y() )/mm |
---|
1943 | << " mm" << G4endl << G4endl ; |
---|
1944 | if( (p.x() != 0.) || (p.x() != 0.) ) |
---|
1945 | { |
---|
1946 | G4cout << "point phi = " << std::atan2(p.y(),p.x())/degree |
---|
1947 | << " degree" << G4endl << G4endl ; |
---|
1948 | } |
---|
1949 | G4Exception("G4Cons::DistanceToOut(p)", "Notification", |
---|
1950 | JustWarning, "Point p is outside !?" ); |
---|
1951 | } |
---|
1952 | #endif |
---|
1953 | |
---|
1954 | rho = std::sqrt(p.x()*p.x() + p.y()*p.y()) ; |
---|
1955 | safeZ = fDz - std::fabs(p.z()) ; |
---|
1956 | |
---|
1957 | if (fRmin1 || fRmin2) |
---|
1958 | { |
---|
1959 | tanRMin = (fRmin2 - fRmin1)*0.5/fDz ; |
---|
1960 | secRMin = std::sqrt(1.0 + tanRMin*tanRMin) ; |
---|
1961 | pRMin = tanRMin*p.z() + (fRmin1 + fRmin2)*0.5 ; |
---|
1962 | safeR1 = (rho - pRMin)/secRMin ; |
---|
1963 | } |
---|
1964 | else |
---|
1965 | { |
---|
1966 | safeR1 = kInfinity ; |
---|
1967 | } |
---|
1968 | |
---|
1969 | tanRMax = (fRmax2 - fRmax1)*0.5/fDz ; |
---|
1970 | secRMax = std::sqrt(1.0 + tanRMax*tanRMax) ; |
---|
1971 | pRMax = tanRMax*p.z() + (fRmax1+fRmax2)*0.5 ; |
---|
1972 | safeR2 = (pRMax - rho)/secRMax ; |
---|
1973 | |
---|
1974 | if (safeR1 < safeR2) { safe = safeR1; } |
---|
1975 | else { safe = safeR2; } |
---|
1976 | if (safeZ < safe) { safe = safeZ ; } |
---|
1977 | |
---|
1978 | // Check if phi divided, Calc distances closest phi plane |
---|
1979 | |
---|
1980 | if (!fPhiFullCone) |
---|
1981 | { |
---|
1982 | // Above/below central phi of G4Cons? |
---|
1983 | |
---|
1984 | if ( (p.y()*cosCPhi - p.x()*sinCPhi) <= 0 ) |
---|
1985 | { |
---|
1986 | safePhi = -(p.x()*sinSPhi - p.y()*cosSPhi) ; |
---|
1987 | } |
---|
1988 | else |
---|
1989 | { |
---|
1990 | safePhi = (p.x()*sinEPhi - p.y()*cosEPhi) ; |
---|
1991 | } |
---|
1992 | if (safePhi < safe) { safe = safePhi; } |
---|
1993 | } |
---|
1994 | if ( safe < 0 ) { safe = 0; } |
---|
1995 | |
---|
1996 | return safe ; |
---|
1997 | } |
---|
1998 | |
---|
1999 | //////////////////////////////////////////////////////////////////////////// |
---|
2000 | // |
---|
2001 | // Create a List containing the transformed vertices |
---|
2002 | // Ordering [0-3] -fDz cross section |
---|
2003 | // [4-7] +fDz cross section such that [0] is below [4], |
---|
2004 | // [1] below [5] etc. |
---|
2005 | // Note: |
---|
2006 | // Caller has deletion resposibility |
---|
2007 | // Potential improvement: For last slice, use actual ending angle |
---|
2008 | // to avoid rounding error problems. |
---|
2009 | |
---|
2010 | G4ThreeVectorList* |
---|
2011 | G4Cons::CreateRotatedVertices(const G4AffineTransform& pTransform) const |
---|
2012 | { |
---|
2013 | G4ThreeVectorList* vertices ; |
---|
2014 | G4ThreeVector vertex0, vertex1, vertex2, vertex3 ; |
---|
2015 | G4double meshAngle, meshRMax1, meshRMax2, crossAngle; |
---|
2016 | G4double cosCrossAngle, sinCrossAngle, sAngle ; |
---|
2017 | G4double rMaxX1, rMaxX2, rMaxY1, rMaxY2, rMinX1, rMinX2, rMinY1, rMinY2 ; |
---|
2018 | G4int crossSection, noCrossSections ; |
---|
2019 | |
---|
2020 | // Compute no of cross-sections necessary to mesh cone |
---|
2021 | |
---|
2022 | noCrossSections = G4int(fDPhi/kMeshAngleDefault) + 1 ; |
---|
2023 | |
---|
2024 | if (noCrossSections < kMinMeshSections) |
---|
2025 | { |
---|
2026 | noCrossSections = kMinMeshSections ; |
---|
2027 | } |
---|
2028 | else if (noCrossSections > kMaxMeshSections) |
---|
2029 | { |
---|
2030 | noCrossSections = kMaxMeshSections ; |
---|
2031 | } |
---|
2032 | meshAngle = fDPhi/(noCrossSections - 1) ; |
---|
2033 | |
---|
2034 | meshRMax1 = fRmax1/std::cos(meshAngle*0.5) ; |
---|
2035 | meshRMax2 = fRmax2/std::cos(meshAngle*0.5) ; |
---|
2036 | |
---|
2037 | // If complete in phi, set start angle such that mesh will be at RMax |
---|
2038 | // on the x axis. Will give better extent calculations when not rotated. |
---|
2039 | |
---|
2040 | if ( fPhiFullCone && (fSPhi == 0.0) ) |
---|
2041 | { |
---|
2042 | sAngle = -meshAngle*0.5 ; |
---|
2043 | } |
---|
2044 | else |
---|
2045 | { |
---|
2046 | sAngle = fSPhi ; |
---|
2047 | } |
---|
2048 | vertices = new G4ThreeVectorList(); |
---|
2049 | vertices->reserve(noCrossSections*4) ; |
---|
2050 | |
---|
2051 | if (vertices) |
---|
2052 | { |
---|
2053 | for (crossSection = 0 ; crossSection < noCrossSections ; crossSection++) |
---|
2054 | { |
---|
2055 | // Compute coordinates of cross section at section crossSection |
---|
2056 | |
---|
2057 | crossAngle = sAngle + crossSection*meshAngle ; |
---|
2058 | cosCrossAngle = std::cos(crossAngle) ; |
---|
2059 | sinCrossAngle = std::sin(crossAngle) ; |
---|
2060 | |
---|
2061 | rMaxX1 = meshRMax1*cosCrossAngle ; |
---|
2062 | rMaxY1 = meshRMax1*sinCrossAngle ; |
---|
2063 | rMaxX2 = meshRMax2*cosCrossAngle ; |
---|
2064 | rMaxY2 = meshRMax2*sinCrossAngle ; |
---|
2065 | |
---|
2066 | rMinX1 = fRmin1*cosCrossAngle ; |
---|
2067 | rMinY1 = fRmin1*sinCrossAngle ; |
---|
2068 | rMinX2 = fRmin2*cosCrossAngle ; |
---|
2069 | rMinY2 = fRmin2*sinCrossAngle ; |
---|
2070 | |
---|
2071 | vertex0 = G4ThreeVector(rMinX1,rMinY1,-fDz) ; |
---|
2072 | vertex1 = G4ThreeVector(rMaxX1,rMaxY1,-fDz) ; |
---|
2073 | vertex2 = G4ThreeVector(rMaxX2,rMaxY2,+fDz) ; |
---|
2074 | vertex3 = G4ThreeVector(rMinX2,rMinY2,+fDz) ; |
---|
2075 | |
---|
2076 | vertices->push_back(pTransform.TransformPoint(vertex0)) ; |
---|
2077 | vertices->push_back(pTransform.TransformPoint(vertex1)) ; |
---|
2078 | vertices->push_back(pTransform.TransformPoint(vertex2)) ; |
---|
2079 | vertices->push_back(pTransform.TransformPoint(vertex3)) ; |
---|
2080 | } |
---|
2081 | } |
---|
2082 | else |
---|
2083 | { |
---|
2084 | DumpInfo(); |
---|
2085 | G4Exception("G4Cons::CreateRotatedVertices()", |
---|
2086 | "FatalError", FatalException, |
---|
2087 | "Error in allocation of vertices. Out of memory !"); |
---|
2088 | } |
---|
2089 | |
---|
2090 | return vertices ; |
---|
2091 | } |
---|
2092 | |
---|
2093 | ////////////////////////////////////////////////////////////////////////// |
---|
2094 | // |
---|
2095 | // GetEntityType |
---|
2096 | |
---|
2097 | G4GeometryType G4Cons::GetEntityType() const |
---|
2098 | { |
---|
2099 | return G4String("G4Cons"); |
---|
2100 | } |
---|
2101 | |
---|
2102 | ////////////////////////////////////////////////////////////////////////// |
---|
2103 | // |
---|
2104 | // Stream object contents to an output stream |
---|
2105 | |
---|
2106 | std::ostream& G4Cons::StreamInfo(std::ostream& os) const |
---|
2107 | { |
---|
2108 | os << "-----------------------------------------------------------\n" |
---|
2109 | << " *** Dump for solid - " << GetName() << " ***\n" |
---|
2110 | << " ===================================================\n" |
---|
2111 | << " Solid type: G4Cons\n" |
---|
2112 | << " Parameters: \n" |
---|
2113 | << " inside -fDz radius: " << fRmin1/mm << " mm \n" |
---|
2114 | << " outside -fDz radius: " << fRmax1/mm << " mm \n" |
---|
2115 | << " inside +fDz radius: " << fRmin2/mm << " mm \n" |
---|
2116 | << " outside +fDz radius: " << fRmax2/mm << " mm \n" |
---|
2117 | << " half length in Z : " << fDz/mm << " mm \n" |
---|
2118 | << " starting angle of segment: " << fSPhi/degree << " degrees \n" |
---|
2119 | << " delta angle of segment : " << fDPhi/degree << " degrees \n" |
---|
2120 | << "-----------------------------------------------------------\n"; |
---|
2121 | |
---|
2122 | return os; |
---|
2123 | } |
---|
2124 | |
---|
2125 | |
---|
2126 | |
---|
2127 | ///////////////////////////////////////////////////////////////////////// |
---|
2128 | // |
---|
2129 | // GetPointOnSurface |
---|
2130 | |
---|
2131 | G4ThreeVector G4Cons::GetPointOnSurface() const |
---|
2132 | { |
---|
2133 | // declare working variables |
---|
2134 | // |
---|
2135 | G4double Aone, Atwo, Athree, Afour, Afive, slin, slout, phi; |
---|
2136 | G4double zRand, cosu, sinu, rRand1, rRand2, chose, rone, rtwo, qone, qtwo; |
---|
2137 | rone = (fRmax1-fRmax2)/(2.*fDz); |
---|
2138 | rtwo = (fRmin1-fRmin2)/(2.*fDz); |
---|
2139 | qone=0.; qtwo=0.; |
---|
2140 | if(fRmax1!=fRmax2) { qone = fDz*(fRmax1+fRmax2)/(fRmax1-fRmax2); } |
---|
2141 | if(fRmin1!=fRmin2) { qtwo = fDz*(fRmin1+fRmin2)/(fRmin1-fRmin2); } |
---|
2142 | slin = std::sqrt(sqr(fRmin1-fRmin2)+sqr(2.*fDz)); |
---|
2143 | slout = std::sqrt(sqr(fRmax1-fRmax2)+sqr(2.*fDz)); |
---|
2144 | Aone = 0.5*fDPhi*(fRmax2 + fRmax1)*slout; |
---|
2145 | Atwo = 0.5*fDPhi*(fRmin2 + fRmin1)*slin; |
---|
2146 | Athree = 0.5*fDPhi*(fRmax1*fRmax1-fRmin1*fRmin1); |
---|
2147 | Afour = 0.5*fDPhi*(fRmax2*fRmax2-fRmin2*fRmin2); |
---|
2148 | Afive = fDz*(fRmax1-fRmin1+fRmax2-fRmin2); |
---|
2149 | |
---|
2150 | phi = RandFlat::shoot(fSPhi,fSPhi+fDPhi); |
---|
2151 | cosu = std::cos(phi); sinu = std::sin(phi); |
---|
2152 | rRand1 = RandFlat::shoot(fRmin1,fRmax1); |
---|
2153 | rRand2 = RandFlat::shoot(fRmin2,fRmax2); |
---|
2154 | |
---|
2155 | if ( (fSPhi == 0.) && fPhiFullCone ) { Afive = 0.; } |
---|
2156 | chose = RandFlat::shoot(0.,Aone+Atwo+Athree+Afour+2.*Afive); |
---|
2157 | |
---|
2158 | if( (chose >= 0.) && (chose < Aone) ) |
---|
2159 | { |
---|
2160 | if(fRmin1 != fRmin2) |
---|
2161 | { |
---|
2162 | zRand = RandFlat::shoot(-1.*fDz,fDz); |
---|
2163 | return G4ThreeVector (rtwo*cosu*(qtwo-zRand), |
---|
2164 | rtwo*sinu*(qtwo-zRand), zRand); |
---|
2165 | } |
---|
2166 | else |
---|
2167 | { |
---|
2168 | return G4ThreeVector(fRmin1*cosu, fRmin2*sinu, |
---|
2169 | RandFlat::shoot(-1.*fDz,fDz)); |
---|
2170 | } |
---|
2171 | } |
---|
2172 | else if( (chose >= Aone) && (chose <= Aone + Atwo) ) |
---|
2173 | { |
---|
2174 | if(fRmax1 != fRmax2) |
---|
2175 | { |
---|
2176 | zRand = RandFlat::shoot(-1.*fDz,fDz); |
---|
2177 | return G4ThreeVector (rone*cosu*(qone-zRand), |
---|
2178 | rone*sinu*(qone-zRand), zRand); |
---|
2179 | } |
---|
2180 | else |
---|
2181 | { |
---|
2182 | return G4ThreeVector(fRmax1*cosu, fRmax2*sinu, |
---|
2183 | RandFlat::shoot(-1.*fDz,fDz)); |
---|
2184 | } |
---|
2185 | } |
---|
2186 | else if( (chose >= Aone + Atwo) && (chose < Aone + Atwo + Athree) ) |
---|
2187 | { |
---|
2188 | return G4ThreeVector (rRand1*cosu, rRand1*sinu, -1*fDz); |
---|
2189 | } |
---|
2190 | else if( (chose >= Aone + Atwo + Athree) |
---|
2191 | && (chose < Aone + Atwo + Athree + Afour) ) |
---|
2192 | { |
---|
2193 | return G4ThreeVector (rRand2*cosu,rRand2*sinu,fDz); |
---|
2194 | } |
---|
2195 | else if( (chose >= Aone + Atwo + Athree + Afour) |
---|
2196 | && (chose < Aone + Atwo + Athree + Afour + Afive) ) |
---|
2197 | { |
---|
2198 | zRand = RandFlat::shoot(-1.*fDz,fDz); |
---|
2199 | rRand1 = RandFlat::shoot(fRmin2-((zRand-fDz)/(2.*fDz))*(fRmin1-fRmin2), |
---|
2200 | fRmax2-((zRand-fDz)/(2.*fDz))*(fRmax1-fRmax2)); |
---|
2201 | return G4ThreeVector (rRand1*std::cos(fSPhi), |
---|
2202 | rRand1*std::sin(fSPhi), zRand); |
---|
2203 | } |
---|
2204 | else |
---|
2205 | { |
---|
2206 | zRand = RandFlat::shoot(-1.*fDz,fDz); |
---|
2207 | rRand1 = RandFlat::shoot(fRmin2-((zRand-fDz)/(2.*fDz))*(fRmin1-fRmin2), |
---|
2208 | fRmax2-((zRand-fDz)/(2.*fDz))*(fRmax1-fRmax2)); |
---|
2209 | return G4ThreeVector (rRand1*std::cos(fSPhi+fDPhi), |
---|
2210 | rRand1*std::sin(fSPhi+fDPhi), zRand); |
---|
2211 | } |
---|
2212 | } |
---|
2213 | |
---|
2214 | ////////////////////////////////////////////////////////////////////////// |
---|
2215 | // |
---|
2216 | // Methods for visualisation |
---|
2217 | |
---|
2218 | void G4Cons::DescribeYourselfTo (G4VGraphicsScene& scene) const |
---|
2219 | { |
---|
2220 | scene.AddSolid (*this); |
---|
2221 | } |
---|
2222 | |
---|
2223 | G4Polyhedron* G4Cons::CreatePolyhedron () const |
---|
2224 | { |
---|
2225 | return new G4PolyhedronCons(fRmin1,fRmax1,fRmin2,fRmax2,fDz,fSPhi,fDPhi); |
---|
2226 | } |
---|
2227 | |
---|
2228 | G4NURBS* G4Cons::CreateNURBS () const |
---|
2229 | { |
---|
2230 | G4double RMax = (fRmax2 >= fRmax1) ? fRmax2 : fRmax1 ; |
---|
2231 | return new G4NURBSbox (RMax, RMax, fDz); // Box for now!!! |
---|
2232 | } |
---|