//
// ********************************************************************
// * 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: G4GaussLaguerreQ.hh,v 1.6 2006-06-29 18:59:40 gunter Exp $
// GEANT4 tag $Name: not supported by cvs2svn $
//
// Class description:
//
// Class for realization of Gauss-Laguerre quadrature method
// Roots of ortogonal polynoms and corresponding weights are calculated based on
// iteration method (by bisection Newton algorithm). Constant values for initial
// approximations were derived from the book: M. Abramowitz, I. Stegun, Handbook
// of mathematical functions, DOVER Publications INC, New York 1965 ; chapters 9,
// 10, and 22 .
//
// ---------------------------------------------------------------------------
//
// Constructor for Gauss-Laguerre quadrature method: integral from zero to
// infinity of std::pow(x,alpha)*std::exp(-x)*f(x). The value of nLaguerre sets the accuracy.
// The constructor creates arrays fAbscissa[0,..,nLaguerre-1] and
// fWeight[0,..,nLaguerre-1] . The function GaussLaguerre(f) should be called
// then with any f .
//
// G4GaussLaguerreQ( function pFunction,
// G4double alpha,
// G4int nLaguerre )
//
//
// -------------------------------------------------------------------------
//
// Gauss-Laguerre method for integration of std::pow(x,alpha)*std::exp(-x)*pFunction(x)
// from zero up to infinity. pFunction is evaluated in fNumber points for which
// fAbscissa[i] and fWeight[i] arrays were created in constructor
//
// G4double Integral() const
// ------------------------------- HISTORY --------------------------------
//
// 13.05.97 V.Grichine (Vladimir.Grichine@cern.chz0
#ifndef G4GAUSSLAGUERREQ_HH
#define G4GAUSSLAGUERREQ_HH
#include "G4VGaussianQuadrature.hh"
class G4GaussLaguerreQ : public G4VGaussianQuadrature
{
public:
G4GaussLaguerreQ( function pFunction,
G4double alpha,
G4int nLaguerre ) ;
// Methods
G4double Integral() const ;
private:
G4GaussLaguerreQ(const G4GaussLaguerreQ&);
G4GaussLaguerreQ& operator=(const G4GaussLaguerreQ&);
};
#endif