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Genfun::GaudiMathImplementation::NumericalDefiniteIntegral Class Reference

This class allows the numerical evaluation of the following functions: More...

#include <NumericalDefiniteIntegral.h>

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Classes

struct  _Function
 
struct  _Workspace
 

Public Types

typedef std::vector< double > Points
 typedef for vector of singular points
 

Public Member Functions

 NumericalDefiniteIntegral (const AbsFunction &function, const size_t index, const double a, const double b, const GaudiMath::Integration::Type type=GaudiMath::Integration::Adaptive, const GaudiMath::Integration::KronrodRule rule=GaudiMath::Integration::Default, const double epsabs=1.e-10, const double epsrel=1.e-7, const size_t size=1000)
 From CLHEP/GenericFunctions.
 
 NumericalDefiniteIntegral (const AbsFunction &function, const size_t index, const double a, const double b, const Points &points, const double epsabs=1e-9, const double epsrel=1.e-6, const size_t size=1000)
 Standard constructor The function created with this constructor compute the following integral:
 
 NumericalDefiniteIntegral (const AbsFunction &function, const size_t index, const double a, const GaudiMath::Integration::Inf b=GaudiMath::Integration::Infinity, const double epsabs=1e-9, const double epsrel=1.e-6, const size_t size=1000)
 Standard constructor The function created with this constructor compute the following integral:
 
 NumericalDefiniteIntegral (const AbsFunction &function, const size_t index, const GaudiMath::Integration::Inf a, const double b, const double epsabs=1e-9, const double epsrel=1.e-6, const size_t size=1000)
 Standard constructor The function created with this constructor compute the following integral:
 
 NumericalDefiniteIntegral (const AbsFunction &function, const size_t index, const float epsabs=1e-9, const float epsrel=1.e-6, const size_t size=1000)
 Standard constructor The function created with this constructor compute the following integral:
 
 NumericalDefiniteIntegral (const NumericalDefiniteIntegral &)
 copy constructor
 
virtual ~NumericalDefiniteIntegral ()
 destructor
 
virtual unsigned int dimensionality () const
 dimensionality of the problem
 
virtual double operator() (double argument) const
 Function value.
 
virtual double operator() (const Argument &argument) const
 Function value.
 
virtual bool hasAnalyticDerivative () const
 Does this function have an analytic derivative?
 
virtual Genfun::Derivative partial (unsigned int index) const
 Derivatives.
 
const AbsFunction & function () const
 accessor to the function itself
 
double a () const
 integration limit
 
double b () const
 
const Pointspoints () const
 known singularities
 
double epsabs () const
 absolute precision
 
double epsrel () const
 relatiove precision
 
double result () const
 previous result
 
double error () const
 evaluate of previous error
 
size_t size () const
 
GaudiMath::Integration::Type type () const
 integration type
 
GaudiMath::Integration::Category category () const
 integration category
 
GaudiMath::Integration::KronrodRule rule () const
 integration rule
 

Protected Member Functions

double QAGI (_Function *fun) const
 
double QAGP (_Function *fun) const
 
double QNG (_Function *fun) const
 
double QAG (_Function *fun) const
 
double QAGS (_Function *fun) const
 
_Workspaceallocate () const
 allocate the integration workspace
 
_Workspacews () const
 
StatusCode Exception (const std::string &message, const StatusCode &sc=StatusCode::FAILURE) const
 

Private Member Functions

 NumericalDefiniteIntegral ()
 
NumericalDefiniteIntegraloperator= (const NumericalDefiniteIntegral &)
 

Private Attributes

const AbsFunction * m_function
 
size_t m_DIM
 
size_t m_index
 
double m_a
 
double m_b
 
bool m_ia
 
bool m_ib
 
GaudiMath::Integration::Type m_type
 
GaudiMath::Integration::Category m_category
 
GaudiMath::Integration::KronrodRule m_rule
 
Points m_points
 
double * m_pdata
 
double m_epsabs
 
double m_epsrel
 
double m_result
 
double m_error
 
size_t m_size
 
_Workspacem_ws
 
Argument m_argument
 
Argument m_argF
 

Detailed Description

This class allows the numerical evaluation of the following functions:

\[ {\mathcal{F}}_i \left(x_1, \dots , x_{i-1}, x_{i+1}, \dots , x_n \right) = \int\limits_{a}^{b} f \left(x_1, \dots , x_{i-1}, \hat{x}_i , x_{i+1}, \dots , x_n \right) \, {\mathrm{d}} \hat{x}_i \]

\[ {\mathcal{F}}_i \left(x_1, \dots , x_{i-1}, x_{i+1}, \dots , x_n \right) = \int\limits_{a}^{+\infty} f \left(x_1, \dots , x_{i-1}, \hat{x}_i , x_{i+1}, \dots , x_n \right) \, {\mathrm{d}} \hat{x}_i \]

\[ {\mathcal{F}}_i \left(x_1, \dots , x_{i-1}, x_{i+1}, \dots , x_n \right) = \int\limits_{-\infty}^{b} f \left(x_1, \dots , x_{i-1}, \hat{x}_i , x_{i+1}, \dots , x_n \right) \, {\mathrm{d}} \hat{x}_i \]

\[ {\mathcal{F}}_i \left(x_1, \dots , x_{i-1}, x_{i+1}, \dots , x_n \right) = \int\limits_{-\infty}^{+\infty} f \left(x_1, \dots , x_{i-1}, \hat{x}_i , x_{i+1}, \dots , x_n \right) \, {\mathrm{d}} \hat{x}_i \]

Author
Vanya BELYAEV Ivan..nosp@m.Bely.nosp@m.aev@i.nosp@m.tep..nosp@m.ru
Date
2003-08-31

Definition at line 72 of file NumericalDefiniteIntegral.h.

Member Typedef Documentation

typedef std::vector<double> Genfun::GaudiMathImplementation::NumericalDefiniteIntegral::Points

typedef for vector of singular points

Definition at line 76 of file NumericalDefiniteIntegral.h.

Constructor & Destructor Documentation

Genfun::GaudiMathImplementation::NumericalDefiniteIntegral::NumericalDefiniteIntegral ( const AbsFunction &  function,
const size_t  index,
const double  a,
const double  b,
const GaudiMath::Integration::Type  type = GaudiMath::Integration::Adaptive,
const GaudiMath::Integration::KronrodRule  rule = GaudiMath::Integration::Default,
const double  epsabs = 1.e-10,
const double  epsrel = 1.e-7,
const size_t  size = 1000 
)

From CLHEP/GenericFunctions.

from CLHEP/GenericFunctions

Standard constructor The function created with this constructor compute the following integral:

\[ {\mathcal{F}}_i \left(x_1, \dots , x_{i-1}, x_{i+1}, \dots , x_n \right) = \int\limits_{a}^{b} f \left(x_1, \dots , x_{i-1}, \hat{x}_i , x_{i+1}, \dots , x_n \right) \, {\mathrm{d}} \hat{x}_i \]

If function contains singularities, the type = Type::AdaptiveSingular need to be used

For faster integration of smooth function non-adaptive integration can be used: type = Type::NonAdaptive need to be used

For adaptive integration type = Type>>Adaptive one can specify the order of Gauss-Kronrad integration rule rule = KronrodRule::Gauss15 The higher-order rules give better accuracy for smooth functions, while lower-order rules save the time when the function contains local difficulties, such as discontinuites.

  • The GSL routine gsl_integration_qng is used for type = Type:NonAdaptive :

The GSL routine gsl_integration_qag is used for type = Type:Adaptive :

  • The GSL routine gsl_integration_qags is used for type = Type:AdaptiveSingular :
Parameters
functionfuntion to be integrated
indexvariable index
alower intgeration limit
bhigh integration limit
typeintegration type
ruleintegration rule (for adaptive integration)
epsabsrequired absolute precision
epsrelrequired relative precision
sizemaximal number of bisections for adaptive integration

Definition at line 110 of file NumericalDefiniteIntegral.cpp.

: AbsFunction ()
, m_function ( function.clone () )
, m_DIM ( 0 )
, m_index ( index )
, m_a ( a )
, m_b ( b )
, m_ia ( false )
, m_ib ( false )
, m_type ( type )
, m_category ( GaudiMath::Integration::Finite )
, m_rule ( rule )
, m_points ( )
, m_pdata ( 0 )
, m_epsabs ( epsabs )
, m_epsrel ( epsrel )
, m_result ( GSL_NEGINF )
, m_error ( GSL_POSINF )
, m_size ( size )
, m_ws ()
, m_argument ()
, m_argF ()
{
if ( GaudiMath::Integration::Fixed == m_rule )
{ m_rule = GaudiMath::Integration::Default ; }
if ( function.dimensionality() < 2 )
{ Exception("::constructor: invalid dimensionality ") ; }
if ( m_index >= function.dimensionality() )
{ Exception("::constructor: invalid variable index") ; }
m_DIM = function.dimensionality() - 1 ;
m_argument = Argument( m_DIM ) ;
m_argF = Argument( m_DIM + 1 ) ;
}
Genfun::GaudiMathImplementation::NumericalDefiniteIntegral::NumericalDefiniteIntegral ( const AbsFunction &  function,
const size_t  index,
const double  a,
const double  b,
const Points points,
const double  epsabs = 1e-9,
const double  epsrel = 1.e-6,
const size_t  size = 1000 
)

Standard constructor The function created with this constructor compute the following integral:

standard constructor

\[ {\mathcal{F}}_i \left(x_1, \dots , x_{i-1}, x_{i+1}, \dots , x_n \right) = \int\limits_{a}^{b} f \left(x_1, \dots , x_{i-1}, \hat{x}_i , x_{i+1}, \dots , x_n \right) \, {\mathrm{d}} \hat{x}_i \]

where function have known singulatities

  • The GSL routine gsl_integration_qagp is used for integration
Parameters
functionfuntion to be integrated
indexvariable index
alower intgeration limit
bhigh integration limit
pointnsvector of know singular points
epsabsrequired absolute precision
epsrelrequired relative precision
sizemaximal number of bisections for adaptive integration
functionthe base function
indexthe variable index
aintegration limit
bintegration limit
pointslist of known function singularities
epsabsabsolute precision for integration
epsrelrelative precision for integration

Definition at line 165 of file NumericalDefiniteIntegral.cpp.

: AbsFunction ()
, m_function ( function.clone() )
, m_DIM ( 0 )
, m_index ( index )
, m_a ( a )
, m_b ( b )
, m_ia ( false )
, m_ib ( false )
, m_type ( GaudiMath::Integration:: Other )
, m_category ( GaudiMath::Integration:: Singular )
, m_rule ( GaudiMath::Integration:: Fixed )
, m_points ( points )
, m_pdata ( 0 )
, m_epsabs ( epsabs )
, m_epsrel ( epsrel )
//
, m_result ( GSL_NEGINF )
, m_error ( GSL_POSINF )
//
, m_size ( size )
, m_ws ( 0 )
, m_argument ()
, m_argF ()
{
if ( function.dimensionality() < 2 )
{ Exception("::constructor: invalid dimensionality ") ; }
if ( m_index >= function.dimensionality() )
{ Exception("::constructor: invalid variable index") ; }
m_DIM = function.dimensionality() - 1 ;
m_argument = Argument( m_DIM ) ;
m_argF = Argument( m_DIM + 1 ) ;
const double l1 = std::min ( a , b ) ;
const double l2 = std::max ( a , b ) ;
m_points.push_back ( l1 ) ;
m_points.push_back ( l2 ) ;
std::sort ( m_points.begin() , m_points.end() ) ;
m_points.erase( std::unique( m_points.begin () ,
m_points.end () ) ,
m_points.end() );
Points::iterator lower =
std::lower_bound ( m_points.begin () , m_points.end () , l1 ) ;
m_points.erase ( m_points.begin () , lower ) ;
Points::iterator upper =
std::upper_bound ( m_points.begin () , m_points.end () , l2 ) ;
m_points.erase ( upper , m_points.end () ) ;
m_pdata = new double[ m_points.size() ] ;
std::copy( m_points.begin() , m_points.end() , m_pdata );
}
Genfun::GaudiMathImplementation::NumericalDefiniteIntegral::NumericalDefiniteIntegral ( const AbsFunction &  function,
const size_t  index,
const double  a,
const GaudiMath::Integration::Inf  b = GaudiMath::Integration::Infinity,
const double  epsabs = 1e-9,
const double  epsrel = 1.e-6,
const size_t  size = 1000 
)

Standard constructor The function created with this constructor compute the following integral:

\[ {\mathcal{F}}_i \left(x_1, \dots , x_{i-1}, x_{i+1}, \dots , x_n \right) = \int\limits_{a}^{+\infty} f \left(x_1, \dots , x_{i-1}, \hat{x}_i , x_{i+1}, \dots , x_n \right) \, {\mathrm{d}} \hat{x}_i \]

  • The GSL routine gsl_integration_qagiu is used for integration
Parameters
functionfuntion to be integrated
indexvariable index
alower intgeration limit
bindication for infinity
epsabsrequired absolute precision
epsrelrequired relative precision
sizemaximal number of bisections for adaptive integration

Definition at line 252 of file NumericalDefiniteIntegral.cpp.

: AbsFunction()
, m_function ( function.clone() )
, m_DIM ( 0 )
, m_index ( index )
, m_a ( a )
, m_b ( GSL_POSINF )
, m_ia ( false )
, m_ib ( true )
, m_type ( GaudiMath::Integration:: Other )
, m_category ( GaudiMath::Integration:: Infinite )
, m_rule ( GaudiMath::Integration:: Fixed )
, m_points ( )
, m_pdata ( 0 )
, m_epsabs ( epsabs )
, m_epsrel ( epsrel )
//
, m_result ( GSL_NEGINF )
, m_error ( GSL_POSINF )
//
, m_size ( size )
, m_ws ( 0 )
, m_argument ()
, m_argF ()
{
if ( function.dimensionality() < 2 )
{ Exception("::constructor: invalid dimensionality ") ; }
if ( m_index >= function.dimensionality() )
{ Exception("::constructor: invalid variable index") ; }
m_DIM = function.dimensionality() - 1 ;
m_argument = Argument( m_DIM ) ;
m_argF = Argument( m_DIM + 1 ) ;
}
Genfun::GaudiMathImplementation::NumericalDefiniteIntegral::NumericalDefiniteIntegral ( const AbsFunction &  function,
const size_t  index,
const GaudiMath::Integration::Inf  a,
const double  b,
const double  epsabs = 1e-9,
const double  epsrel = 1.e-6,
const size_t  size = 1000 
)

Standard constructor The function created with this constructor compute the following integral:

\[ {\mathcal{F}}_i \left(x_1, \dots , x_{i-1}, x_{i+1}, \dots , x_n \right) = \int\limits_{-\infty}^{b} f \left(x_1, \dots , x_{i-1}, \hat{x}_i , x_{i+1}, \dots , x_n \right) \, {\mathrm{d}} \hat{x}_i \]

  • The GSL routine gsl_integration_qagiu is used for integration
Parameters
functionfuntion to be integrated
indexvariable index
alower intgeration limit
bindication for infinity
epsabsrequired absolute precision
epsrelrequired relative precision
sizemaximal number of bisections for adaptive integration

Definition at line 321 of file NumericalDefiniteIntegral.cpp.

: AbsFunction()
, m_function ( function.clone() )
, m_DIM ( 0 )
, m_index ( index )
, m_a ( GSL_NEGINF )
, m_b ( b )
, m_ia ( true )
, m_ib ( false )
, m_type ( GaudiMath::Integration:: Other )
, m_category ( GaudiMath::Integration:: Infinite )
, m_rule ( GaudiMath::Integration:: Fixed )
, m_points ( )
, m_pdata ( 0 )
, m_epsabs ( epsabs )
, m_epsrel ( epsrel )
//
, m_result ( GSL_NEGINF )
, m_error ( GSL_POSINF )
//
, m_size ( size )
, m_ws ( 0 )
, m_argument ()
, m_argF ()
{
if ( function.dimensionality() < 2 )
{ Exception("::constructor: invalid dimensionality ") ; }
if ( m_index >= function.dimensionality() )
{ Exception("::constructor: invalid variable index") ; }
m_DIM = function.dimensionality() - 1 ;
m_argument = Argument( m_DIM ) ;
m_argF = Argument( m_DIM + 1 ) ;
}
Genfun::GaudiMathImplementation::NumericalDefiniteIntegral::NumericalDefiniteIntegral ( const AbsFunction &  function,
const size_t  index,
const float  epsabs = 1e-9,
const float  epsrel = 1.e-6,
const size_t  size = 1000 
)

Standard constructor The function created with this constructor compute the following integral:

\[ {\mathcal{F}}_i \left(x_1, \dots , x_{i-1}, x_{i+1}, \dots , x_n \right) = \int\limits_{-\infty}^{+\infty} f \left(x_1, \dots , x_{i-1}, \hat{x}_i , x_{i+1}, \dots , x_n \right) \, {\mathrm{d}} \hat{x}_i \]

  • The GSL routine gsl_integration_qagi is used for integration
Parameters
functionfuntion to be integrated
indexvariable index
epsabsrequired absolute precision
epsrelrequired relative precision
sizemaximal number of bisections for adaptive integration

Definition at line 386 of file NumericalDefiniteIntegral.cpp.

: AbsFunction()
, m_function ( function.clone() )
, m_DIM ( 0 )
, m_index ( index )
, m_a ( GSL_NEGINF )
, m_b ( GSL_POSINF )
, m_ia ( true )
, m_ib ( true )
, m_type ( GaudiMath::Integration:: Other )
, m_category ( GaudiMath::Integration:: Infinite )
, m_rule ( GaudiMath::Integration:: Fixed )
, m_points ( )
, m_pdata ( 0 )
, m_epsabs ( epsabs )
, m_epsrel ( epsrel )
//
, m_result ( GSL_NEGINF )
, m_error ( GSL_POSINF )
//
, m_size ( size )
, m_ws ( 0 )
, m_argument ()
, m_argF ()
{
if ( function.dimensionality() < 2 )
{ Exception("::constructor: invalid dimensionality ") ; }
if ( m_index >= function.dimensionality() )
{ Exception("::constructor: invalid variable index") ; }
m_DIM = function.dimensionality() - 1 ;
m_argument = Argument( m_DIM ) ;
m_argF = Argument( m_DIM + 1 ) ;
}
Genfun::GaudiMathImplementation::NumericalDefiniteIntegral::NumericalDefiniteIntegral ( const NumericalDefiniteIntegral right)

copy constructor

Definition at line 428 of file NumericalDefiniteIntegral.cpp.

: AbsFunction ()
, m_function ( right.m_function->clone() )
, m_DIM ( right.m_DIM )
, m_index ( right.m_index )
, m_a ( right.m_a )
, m_b ( right.m_b )
, m_ia ( right.m_ia )
, m_ib ( right.m_ib )
, m_type ( right.m_type )
, m_category ( right.m_category )
, m_rule ( right.m_rule )
, m_points ( right.m_points )
, m_pdata ( 0 )
, m_epsabs ( right.m_epsabs )
, m_epsrel ( right.m_epsrel )
, m_result ( GSL_NEGINF )
, m_error ( GSL_POSINF )
, m_size ( right.m_size )
, m_ws ( 0 )
, m_argument ( right.m_argument )
, m_argF ( right.m_argF )
{
if( 0 != right.m_pdata )
{
m_pdata = new double[m_points.size()] ;
std::copy( m_points.begin() , m_points.end() , m_pdata );
}
}
Genfun::GaudiMathImplementation::NumericalDefiniteIntegral::~NumericalDefiniteIntegral ( )
virtual

destructor

Definition at line 458 of file NumericalDefiniteIntegral.cpp.

{
if( 0 != m_function ) { delete m_function ; m_function = 0 ; }
if( 0 != m_pdata ) { delete[] m_pdata ; m_pdata = 0 ; }
}
Genfun::GaudiMathImplementation::NumericalDefiniteIntegral::NumericalDefiniteIntegral ( )
private

Member Function Documentation

double Genfun::GaudiMathImplementation::NumericalDefiniteIntegral::a ( ) const
inline

integration limit

Definition at line 322 of file NumericalDefiniteIntegral.h.

{ return m_a ; }
NumericalDefiniteIntegral::_Workspace * Genfun::GaudiMathImplementation::NumericalDefiniteIntegral::allocate ( ) const
protected

allocate the integration workspace

Definition at line 574 of file NumericalDefiniteIntegral.cpp.

{
if ( 0 != m_ws ) { return m_ws; }
gsl_integration_workspace* aux =
gsl_integration_workspace_alloc( size () );
if ( 0 == aux ) { Exception ( "allocate()::invalid workspace" ) ; };
m_ws = new _Workspace() ;
m_ws->ws = aux ;
return m_ws ;
}
double Genfun::GaudiMathImplementation::NumericalDefiniteIntegral::b ( ) const
inline

Definition at line 323 of file NumericalDefiniteIntegral.h.

{ return m_b ; }
GaudiMath::Integration::Category Genfun::GaudiMathImplementation::NumericalDefiniteIntegral::category ( ) const
inline

integration category

Definition at line 344 of file NumericalDefiniteIntegral.h.

{ return m_category ; }
virtual unsigned int Genfun::GaudiMathImplementation::NumericalDefiniteIntegral::dimensionality ( ) const
inlinevirtual

dimensionality of the problem

Definition at line 304 of file NumericalDefiniteIntegral.h.

{ return m_DIM ; }
double Genfun::GaudiMathImplementation::NumericalDefiniteIntegral::epsabs ( ) const
inline

absolute precision

Definition at line 327 of file NumericalDefiniteIntegral.h.

{ return m_epsabs ; }
double Genfun::GaudiMathImplementation::NumericalDefiniteIntegral::epsrel ( ) const
inline

relatiove precision

Definition at line 329 of file NumericalDefiniteIntegral.h.

{ return m_epsrel ; }
double Genfun::GaudiMathImplementation::NumericalDefiniteIntegral::error ( ) const
inline

evaluate of previous error

Definition at line 334 of file NumericalDefiniteIntegral.h.

{ return m_error ; }
StatusCode Genfun::GaudiMathImplementation::NumericalDefiniteIntegral::Exception ( const std::string &  message,
const StatusCode sc = StatusCode::FAILURE 
) const
protected

Definition at line 468 of file NumericalDefiniteIntegral.cpp.

{
throw GaudiException( "NumericalDefiniteIntegral::" + message ,
"*GaudiMath*" , sc ) ;
return sc ;
}
const AbsFunction& Genfun::GaudiMathImplementation::NumericalDefiniteIntegral::function ( ) const
inline

accessor to the function itself

Definition at line 320 of file NumericalDefiniteIntegral.h.

{ return *m_function ; }
virtual bool Genfun::GaudiMathImplementation::NumericalDefiniteIntegral::hasAnalyticDerivative ( ) const
inlinevirtual

Does this function have an analytic derivative?

Definition at line 312 of file NumericalDefiniteIntegral.h.

{ return true ;}
double Genfun::GaudiMathImplementation::NumericalDefiniteIntegral::operator() ( double  argument) const
virtual

Function value.

evaluate the function

Definition at line 481 of file NumericalDefiniteIntegral.cpp.

{
// reset the result and the error
m_result = GSL_NEGINF ;
m_error = GSL_POSINF ;
// check the argument
if( 1 != m_DIM ) { Exception ( "operator(): invalid argument size " ) ; };
m_argument[0] = argument ;
return (*this) ( m_argument );
}
double Genfun::GaudiMathImplementation::NumericalDefiniteIntegral::operator() ( const Argument &  argument) const
virtual

Function value.

evaluate the function

Definition at line 514 of file NumericalDefiniteIntegral.cpp.

{
// reset the result and the error
m_result = GSL_NEGINF ;
m_error = GSL_POSINF ;
// check the argument
if( argument.dimension() != m_DIM )
{ Exception ( "operator(): invalid argument size " ) ; };
// copy the argument
for( size_t i = 0 ; i < m_DIM ; ++i )
{
m_argument [i] = argument [i] ;
const size_t j = i < m_index ? i : i + 1 ;
m_argF [j] = argument [i] ;
};
// create the helper object
GSL_Helper helper( *m_function , m_argF , m_index );
// use GSL to evaluate the numerical derivative
gsl_function F ;
F.function = &GSL_Adaptor ;
F.params = &helper ;
_Function F1 ;
F1.fn = &F ;
if ( GaudiMath::Integration::Infinite == category () )
{ return QAGI ( &F1 ) ; } // RETURN
if ( m_a == m_b )
{
m_result = 0 ; m_error = 0 ; // EXACT
return m_result ; // RETURN
}
if ( GaudiMath::Integration::Singular == category () )
{ return QAGP ( &F1 ) ; } // RETURN
else if ( GaudiMath::Integration::Finite == category () )
if ( GaudiMath::Integration::NonAdaptive == type () )
{ return QNG ( &F1 ) ; } // RETURN
else if ( GaudiMath::Integration::Adaptive == type () )
{ return QAG ( &F1 ) ; } // RETURN
else if ( GaudiMath::Integration::AdaptiveSingular == type () )
{ return QAGS ( &F1 ) ; } // RETURN
else
{ Exception ( "::operator(): invalid type " ); }
else
{ Exception ( "::operator(): invalid category " ); }
return 0 ;
}
NumericalDefiniteIntegral& Genfun::GaudiMathImplementation::NumericalDefiniteIntegral::operator= ( const NumericalDefiniteIntegral )
private
Genfun::Derivative Genfun::GaudiMathImplementation::NumericalDefiniteIntegral::partial ( unsigned int  index) const
virtual

Derivatives.

Definition at line 499 of file NumericalDefiniteIntegral.cpp.

{
if ( idx >= m_DIM )
{ Exception ( "::partial(i): invalid variable index " ) ; };
//
const AbsFunction& aux = NumericalDerivative( *this , idx ) ;
return Genfun::FunctionNoop( &aux ) ;
}
const Points& Genfun::GaudiMathImplementation::NumericalDefiniteIntegral::points ( ) const
inline

known singularities

Definition at line 325 of file NumericalDefiniteIntegral.h.

{ return m_points ; }
double Genfun::GaudiMathImplementation::NumericalDefiniteIntegral::QAG ( _Function fun) const
protected

Definition at line 692 of file NumericalDefiniteIntegral.cpp.

{
if( 0 == F ) { Exception("QAG::invalid function") ; }
// allocate workspace
if( 0 == ws () ) { allocate () ; }
// integration limits
const double low = std::min ( m_a , m_b ) ;
const double high = std::max ( m_a , m_b ) ;
int ierror =
gsl_integration_qag ( F->fn ,
low , high ,
m_epsabs , m_epsrel ,
size () , (int) rule() , ws ()->ws ,
&m_result , &m_error );
if( ierror ) { gsl_error( "NumericalDefiniteIntegral::QAG " ,
__FILE__ , __LINE__ , ierror ) ; }
// sign
if ( m_a > m_b ) { m_result *= -1 ; }
return m_result ;
}
double Genfun::GaudiMathImplementation::NumericalDefiniteIntegral::QAGI ( _Function fun) const
protected

Definition at line 589 of file NumericalDefiniteIntegral.cpp.

{
// check the argument
if ( 0 == F ) { Exception("::QAGI: invalid function"); }
// allocate workspace
if ( 0 == ws() ) { allocate() ; }
int ierror = 0 ;
if ( m_ia && m_ib )
{
ierror = gsl_integration_qagi ( F->fn ,
m_epsabs , m_epsrel ,
size () , ws()->ws ,
&m_result , &m_error ) ;
}
else if ( m_ia )
{
ierror = gsl_integration_qagil ( F->fn , m_b ,
m_epsabs , m_epsrel ,
size () , ws()->ws ,
&m_result , &m_error ) ;
}
else if ( m_ib )
{
ierror = gsl_integration_qagiu ( F->fn , m_a ,
m_epsabs , m_epsrel ,
size () , ws()->ws ,
&m_result , &m_error ) ;
}
else
{ Exception ( "::QAGI: invalid mode" ) ; };
if( ierror ) { gsl_error( "NumericalDefiniteIntegral::QAGI" ,
__FILE__ , __LINE__ , ierror ) ;}
return m_result ;
}
double Genfun::GaudiMathImplementation::NumericalDefiniteIntegral::QAGP ( _Function fun) const
protected

Definition at line 633 of file NumericalDefiniteIntegral.cpp.

{
if( 0 == F ) { Exception("QAGP::invalid function") ; }
// no known singular points ?
if( points().empty() || 0 == m_pdata ) { return QAGS( F ) ; }
const size_t npts = points().size();
// use GSL
int ierror =
gsl_integration_qagp ( F->fn ,
m_pdata , npts ,
m_epsabs , m_epsrel ,
size () , ws()->ws ,
&m_result , &m_error ) ;
if( ierror ) { gsl_error( "NumericalDefiniteIntegral::QAGI " ,
__FILE__ , __LINE__ , ierror ) ; }
// the sign
if ( m_a > m_b ) { m_result *= -1 ; }
return m_result ;
}
double Genfun::GaudiMathImplementation::NumericalDefiniteIntegral::QAGS ( _Function fun) const
protected

Definition at line 723 of file NumericalDefiniteIntegral.cpp.

{
if( 0 == F ) { Exception("QAG::invalid function") ; }
if ( m_a == m_b )
{
m_result = 0 ;
m_error = 0 ; // EXACT !
return m_result ;
}
// allocate workspace
if( 0 == ws () ) { allocate () ; }
// integration limits
const double low = std::min ( m_a , m_b ) ;
const double high = std::max ( m_a , m_b ) ;
int ierror =
gsl_integration_qags ( F->fn ,
low , high ,
m_epsabs , m_epsrel ,
size () , ws()->ws ,
&m_result , &m_error );
if( ierror ) { gsl_error( "NumericalDefiniteIntegral::QAGS " ,
__FILE__ , __LINE__ , ierror ) ; }
// sign
if ( m_a > m_b ) { m_result *= -1 ; }
return m_result ;
}
double Genfun::GaudiMathImplementation::NumericalDefiniteIntegral::QNG ( _Function fun) const
protected

Definition at line 663 of file NumericalDefiniteIntegral.cpp.

{
if( 0 == F ) { Exception("QNG::invalid function") ; }
// integration limits
const double low = std::min ( m_a , m_b ) ;
const double high = std::max ( m_a , m_b ) ;
size_t neval = 0 ;
int ierror =
gsl_integration_qng ( F->fn ,
low , high ,
m_epsabs , m_epsrel ,
&m_result , &m_error , &neval ) ;
if( ierror ) { gsl_error( "NumericalIndefiniteIntegral::QNG " ,
__FILE__ , __LINE__ , ierror ) ; }
// sign
if ( m_a > m_b ) { m_result *= -1 ; }
return m_result ;
}
double Genfun::GaudiMathImplementation::NumericalDefiniteIntegral::result ( ) const
inline

previous result

Definition at line 332 of file NumericalDefiniteIntegral.h.

{ return m_result ; }
GaudiMath::Integration::KronrodRule Genfun::GaudiMathImplementation::NumericalDefiniteIntegral::rule ( ) const
inline

integration rule

Definition at line 347 of file NumericalDefiniteIntegral.h.

{ return m_rule ; }
size_t Genfun::GaudiMathImplementation::NumericalDefiniteIntegral::size ( ) const
inline

Definition at line 337 of file NumericalDefiniteIntegral.h.

{ return m_size ; }
GaudiMath::Integration::Type Genfun::GaudiMathImplementation::NumericalDefiniteIntegral::type ( ) const
inline

integration type

Definition at line 341 of file NumericalDefiniteIntegral.h.

{ return m_type ; }
_Workspace* Genfun::GaudiMathImplementation::NumericalDefiniteIntegral::ws ( ) const
inlineprotected

Definition at line 365 of file NumericalDefiniteIntegral.h.

{ return m_ws ; };

Member Data Documentation

double Genfun::GaudiMathImplementation::NumericalDefiniteIntegral::m_a
private

Definition at line 386 of file NumericalDefiniteIntegral.h.

Argument Genfun::GaudiMathImplementation::NumericalDefiniteIntegral::m_argF
mutableprivate

Definition at line 408 of file NumericalDefiniteIntegral.h.

Argument Genfun::GaudiMathImplementation::NumericalDefiniteIntegral::m_argument
mutableprivate

Definition at line 407 of file NumericalDefiniteIntegral.h.

double Genfun::GaudiMathImplementation::NumericalDefiniteIntegral::m_b
private

Definition at line 387 of file NumericalDefiniteIntegral.h.

GaudiMath::Integration::Category Genfun::GaudiMathImplementation::NumericalDefiniteIntegral::m_category
private

Definition at line 392 of file NumericalDefiniteIntegral.h.

size_t Genfun::GaudiMathImplementation::NumericalDefiniteIntegral::m_DIM
private

Definition at line 383 of file NumericalDefiniteIntegral.h.

double Genfun::GaudiMathImplementation::NumericalDefiniteIntegral::m_epsabs
private

Definition at line 398 of file NumericalDefiniteIntegral.h.

double Genfun::GaudiMathImplementation::NumericalDefiniteIntegral::m_epsrel
private

Definition at line 399 of file NumericalDefiniteIntegral.h.

double Genfun::GaudiMathImplementation::NumericalDefiniteIntegral::m_error
mutableprivate

Definition at line 402 of file NumericalDefiniteIntegral.h.

const AbsFunction* Genfun::GaudiMathImplementation::NumericalDefiniteIntegral::m_function
private

Definition at line 382 of file NumericalDefiniteIntegral.h.

bool Genfun::GaudiMathImplementation::NumericalDefiniteIntegral::m_ia
private

Definition at line 388 of file NumericalDefiniteIntegral.h.

bool Genfun::GaudiMathImplementation::NumericalDefiniteIntegral::m_ib
private

Definition at line 389 of file NumericalDefiniteIntegral.h.

size_t Genfun::GaudiMathImplementation::NumericalDefiniteIntegral::m_index
private

Definition at line 384 of file NumericalDefiniteIntegral.h.

double* Genfun::GaudiMathImplementation::NumericalDefiniteIntegral::m_pdata
private

Definition at line 396 of file NumericalDefiniteIntegral.h.

Points Genfun::GaudiMathImplementation::NumericalDefiniteIntegral::m_points
private

Definition at line 395 of file NumericalDefiniteIntegral.h.

double Genfun::GaudiMathImplementation::NumericalDefiniteIntegral::m_result
mutableprivate

Definition at line 401 of file NumericalDefiniteIntegral.h.

GaudiMath::Integration::KronrodRule Genfun::GaudiMathImplementation::NumericalDefiniteIntegral::m_rule
private

Definition at line 393 of file NumericalDefiniteIntegral.h.

size_t Genfun::GaudiMathImplementation::NumericalDefiniteIntegral::m_size
private

Definition at line 404 of file NumericalDefiniteIntegral.h.

GaudiMath::Integration::Type Genfun::GaudiMathImplementation::NumericalDefiniteIntegral::m_type
private

Definition at line 391 of file NumericalDefiniteIntegral.h.

_Workspace* Genfun::GaudiMathImplementation::NumericalDefiniteIntegral::m_ws
mutableprivate

Definition at line 405 of file NumericalDefiniteIntegral.h.

The documentation for this class was generated from the following files:
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