// // ******************************************************************** // * License and Disclaimer * // * * // * The Geant4 software is copyright of the Copyright Holders of * // * the Geant4 Collaboration. It is provided under the terms and * // * conditions of the Geant4 Software License, included in the file * // * LICENSE and available at http://cern.ch/geant4/license . These * // * include a list of copyright holders. * // * * // * Neither the authors of this software system, nor their employing * // * institutes,nor the agencies providing financial support for this * // * work make any representation or warranty, express or implied, * // * regarding this software system or assume any liability for its * // * use. Please see the license in the file LICENSE and URL above * // * for the full disclaimer and the limitation of liability. * // * * // * This code implementation is the result of the scientific and * // * technical work of the GEANT4 collaboration. * // * By using, copying, modifying or distributing the software (or * // * any work based on the software) you agree to acknowledge its * // * use in resulting scientific publications, and indicate your * // * acceptance of all terms of the Geant4 Software license. * // ******************************************************************** // // // $Id: G4GaussHermiteQ.cc,v 1.8 2007/11/13 17:35:06 gcosmo Exp $ // GEANT4 tag $Name: geant4-09-02-ref-02 $ // #include "G4GaussHermiteQ.hh" // ---------------------------------------------------------- // // Constructor for Gauss-Hermite G4GaussHermiteQ::G4GaussHermiteQ ( function pFunction, G4int nHermite ) : G4VGaussianQuadrature(pFunction) { const G4double tolerance = 1.0e-12 ; const G4int maxNumber = 12 ; G4int i=1, j=1, k=1 ; G4double newton0=0.; G4double newton1=0.0, temp1=0.0, temp2=0.0, temp3=0.0, temp=0.0 ; G4double piInMinusQ = std::pow(pi,-0.25) ; // 1.0/std::sqrt(std::sqrt(pi)) ?? fNumber = (nHermite +1)/2 ; fAbscissa = new G4double[fNumber] ; fWeight = new G4double[fNumber] ; for(i=1;i<=fNumber;i++) { if(i == 1) { newton0 = std::sqrt((G4double)(2*nHermite + 1)) - 1.85575001*std::pow((G4double)(2*nHermite + 1),-0.16666999) ; } else if(i == 2) { newton0 -= 1.14001*std::pow((G4double)nHermite,0.425999)/newton0 ; } else if(i == 3) { newton0 = 1.86002*newton0 - 0.86002*fAbscissa[0] ; } else if(i == 4) { newton0 = 1.91001*newton0 - 0.91001*fAbscissa[1] ; } else { newton0 = 2.0*newton0 - fAbscissa[i - 3] ; } for(k=1;k<=maxNumber;k++) { temp1 = piInMinusQ ; temp2 = 0.0 ; for(j=1;j<=nHermite;j++) { temp3 = temp2 ; temp2 = temp1 ; temp1 = newton0*std::sqrt(2.0/j)*temp2 - std::sqrt(((G4double)(j - 1))/j)*temp3 ; } temp = std::sqrt((G4double)2*nHermite)*temp2 ; newton1 = newton0 ; newton0 = newton1 - temp1/temp ; if(std::fabs(newton0 - newton1) <= tolerance) { break ; } } if(k > maxNumber) { G4Exception("G4GaussHermiteQ::G4GaussHermiteQ()", "OutOfRange", FatalException, "Too many iterations in Gauss-Hermite constructor.") ; } fAbscissa[i-1] = newton0 ; fWeight[i-1] = 2.0/(temp*temp) ; } } // ---------------------------------------------------------- // // Gauss-Hermite method for integration of std::exp(-x*x)*nFunction(x) // from minus infinity to plus infinity . G4double G4GaussHermiteQ::Integral() const { G4double integral = 0.0 ; for(G4int i=0;i