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Please see the license in the file LICENSE and URL above * 16 // * for the full disclaimer and the limitatio 16 // * for the full disclaimer and the limitation of liability. * 17 // * 17 // * * 18 // * This code implementation is the result 18 // * This code implementation is the result of the scientific and * 19 // * technical work of the GEANT4 collaboratio 19 // * technical work of the GEANT4 collaboration. * 20 // * By using, copying, modifying or distri 20 // * By using, copying, modifying or distributing the software (or * 21 // * any work based on the software) you ag 21 // * any work based on the software) you agree to acknowledge its * 22 // * use in resulting scientific publicati 22 // * use in resulting scientific publications, and indicate your * 23 // * acceptance of all terms of the Geant4 Sof 23 // * acceptance of all terms of the Geant4 Software license. * 24 // ******************************************* 24 // ******************************************************************** 25 // 25 // 26 // G4GaussJacobiQ << 26 // >> 27 // $Id: G4GaussJacobiQ.hh 67970 2013-03-13 10:10:06Z gcosmo $ 27 // 28 // 28 // Class description: 29 // Class description: 29 // 30 // 30 // Roots of ortogonal polynoms and correspondi 31 // Roots of ortogonal polynoms and corresponding weights are calculated based on 31 // iteration method (by bisection Newton algor 32 // iteration method (by bisection Newton algorithm). Constant values for initial 32 // approximations were derived from the book: << 33 // approximations were derived from the book: M. Abramowitz, I. Stegun, Handbook 33 // M. Abramowitz, I. Stegun, Handbook of mat << 34 // of mathematical functions, DOVER Publications INC, New York 1965 ; chapters 9, 34 // DOVER Publications INC, New York 1965 ; c << 35 // 10, and 22 . >> 36 // >> 37 // --------------------------------------------------------------------------- >> 38 // >> 39 // Constructor for Gauss-Jacobi integration method. >> 40 // >> 41 // G4GaussJacobiQ( function pFunction, >> 42 // G4double alpha, >> 43 // G4double beta, >> 44 // G4int nJacobi ) >> 45 // >> 46 // ---------------------------------------------------------------------------- >> 47 // >> 48 // Gauss-Jacobi method for integration of ((1-x)^alpha)*((1+x)^beta)*pFunction(x) >> 49 // from minus unit to plus unit . >> 50 // >> 51 // G4double Integral() const >> 52 >> 53 // ------------------------------- HISTORY ------------------------------------- >> 54 // >> 55 // 13.05.97 V.Grichine (Vladimir.Grichine@cern.chz0 35 56 36 // Author: V.Grichine, 13.05.1997 << 37 // ------------------------------------------- << 38 #ifndef G4GAUSSJACOBIQ_HH 57 #ifndef G4GAUSSJACOBIQ_HH 39 #define G4GAUSSJACOBIQ_HH 1 << 58 #define G4GAUSSJACOBIQ_HH 40 59 41 #include "G4VGaussianQuadrature.hh" 60 #include "G4VGaussianQuadrature.hh" 42 61 43 class G4GaussJacobiQ : public G4VGaussianQuadr 62 class G4GaussJacobiQ : public G4VGaussianQuadrature 44 { 63 { 45 public: << 64 public: 46 G4GaussJacobiQ(function pFunction, G4double << 65 // Constructor 47 G4int nJacobi); << 66 48 // Constructor for Gauss-Jacobi integration << 67 G4GaussJacobiQ( function pFunction, 49 << 68 G4double alpha, 50 G4GaussJacobiQ(const G4GaussJacobiQ&) = dele << 69 G4double beta, 51 G4GaussJacobiQ& operator=(const G4GaussJacob << 70 G4int nJacobi ) ; 52 << 71 53 G4double Integral() const; << 72 // Methods 54 // Gauss-Jacobi method for integration of << 73 55 // ((1-x)^alpha)*((1+x)^beta)*pFunction(x) f << 74 G4double Integral() const ; >> 75 >> 76 private: >> 77 >> 78 G4GaussJacobiQ(const G4GaussJacobiQ&); >> 79 G4GaussJacobiQ& operator=(const G4GaussJacobiQ&); 56 }; 80 }; 57 81 58 #endif 82 #endif 59 83