Specialized IParamFunction interface (abstract class) for one-dimensional parametric functions It is a derived class from ROOT::Math::IBaseFunctionOneDim and ROOT::Math::IBaseParam.
Definition at line 159 of file IParamFunction.h.
Public Types | |
| typedef IBaseFunctionOneDim | BaseFunc |
Public Member Functions | |
| virtual IBaseFunctionOneDim * | Clone () const =0 |
| Clone a function. | |
| double | Derivative (const double *x) const |
| Compatibility method with multi-dimensional interface for partial derivative. | |
| double | Derivative (double x) const |
| Return the derivative of the function at a point x Use the private method DoDerivative. | |
| void | FdF (const double *x, double &f, double *df) const |
| Compatibility method with multi-dimensional interface for Gradient and function evaluation. | |
| virtual void | FdF (double x, double &f, double &df) const |
| Optimized method to evaluate at the same time the function value and derivative at a point x. | |
| void | Gradient (const double *x, double *g) const |
| Compatibility method with multi-dimensional interface for Gradient. | |
| virtual bool | HasGradient () const |
| virtual unsigned int | NPar () const =0 |
| Return the number of Parameters. | |
| double | operator() (const double *x) const |
| Evaluate the function at a point x[]. | |
| double | operator() (const double *x, const double *p) const |
| multidim-like interface | |
| double | operator() (double x) const |
| Evaluate the function at a point x. | |
| double | operator() (double x, const double *p) const |
| Evaluate function at a point x and for given parameters p. | |
| virtual std::string | ParameterName (unsigned int i) const |
| Return the name of the i-th parameter (starting from zero) Overwrite if want to avoid the default name ("Par_0, Par_1, ..."). | |
| virtual const double * | Parameters () const =0 |
| Access the parameter values. | |
| virtual void | SetParameters (const double *p)=0 |
| Set the parameter values. | |
Private Member Functions | |
| virtual double | DoDerivative (double) const |
| Function to evaluate the derivative with respect each coordinate. To be implemented by the derived class. | |
| double | DoEval (double x) const override |
| Implement the ROOT::Math::IBaseFunctionOneDim interface DoEval(x) using the cached parameter values. | |
| virtual double | DoEvalPar (double x, const double *p) const =0 |
| Implementation of the evaluation function using the x value and the parameters. | |
#include <Math/IParamFunction.h>
Definition at line 166 of file IParamFunction.h.
|
pure virtualinherited |
Clone a function.
Each derived class will implement their version of the private DoClone method.
Implemented in RooStats::PosteriorCdfFunction, RooStats::PosteriorFunction, RooStats::PosteriorFunctionFromToyMC, ROOT::Math::CDFWrapper, ROOT::Math::Functor1D, ROOT::Math::GradFunctor1D, ROOT::Math::IntegrandTransform, ROOT::Math::OneDimMultiFunctionAdapter< MultiFuncType >, ROOT::Math::OneDimParamFunctionAdapter< ParamFuncType >, ROOT::Math::PDFIntegral, ROOT::Math::Polynomial, ROOT::Math::VavilovAccurateCdf, ROOT::Math::VavilovAccuratePdf, ROOT::Math::VavilovAccurateQuantile, ROOT::Math::WrappedFunction< Func >, ROOT::Math::WrappedMemFunction< FuncObj, MemFuncPtr >, ROOT::Math::WrappedTF1, and TF1_EvalWrapper.
Compatibility method with multi-dimensional interface for partial derivative.
Definition at line 186 of file IFunction.h.
Return the derivative of the function at a point x Use the private method DoDerivative.
Definition at line 183 of file IFunction.h.
|
inlineprivatevirtualinherited |
Function to evaluate the derivative with respect each coordinate. To be implemented by the derived class.
Reimplemented in ROOT::Math::GradFunctor1D, ROOT::Math::Polynomial, and ROOT::Math::WrappedTF1.
Definition at line 210 of file IFunction.h.
Implement the ROOT::Math::IBaseFunctionOneDim interface DoEval(x) using the cached parameter values.
Implements ROOT::Math::IBaseFunctionOneDim.
Reimplemented in ROOT::Math::VavilovAccurateCdf, ROOT::Math::VavilovAccuratePdf, ROOT::Math::VavilovAccurateQuantile, and ROOT::Math::WrappedTF1.
Definition at line 203 of file IParamFunction.h.
|
privatepure virtual |
Implementation of the evaluation function using the x value and the parameters.
Must be implemented by derived classes
Implemented in ROOT::Math::Polynomial, ROOT::Math::VavilovAccurateCdf, ROOT::Math::VavilovAccuratePdf, ROOT::Math::VavilovAccurateQuantile, and ROOT::Math::WrappedTF1.
|
inlineinherited |
Compatibility method with multi-dimensional interface for Gradient and function evaluation.
Definition at line 202 of file IFunction.h.
|
inlinevirtualinherited |
Optimized method to evaluate at the same time the function value and derivative at a point x.
Often both value and derivatives are needed and it is often more efficient to compute them at the same time. Derived class should implement this method if performances play an important role and if it is faster to evaluate value and derivative at the same time.
Reimplemented in ROOT::Math::Polynomial, and ROOT::Math::WrappedTF1.
Definition at line 195 of file IFunction.h.
|
inlineinherited |
Compatibility method with multi-dimensional interface for Gradient.
Definition at line 189 of file IFunction.h.
|
inlinevirtualinherited |
Reimplemented in ROOT::Math::IGradientFunctionOneDim.
Definition at line 179 of file IFunction.h.
|
pure virtualinherited |
Return the number of Parameters.
Implemented in ROOT::Math::MultiDimParamFunctionAdapter, ROOT::Math::MultiDimParamGradFunctionAdapter, ROOT::Math::ParamFunction< IParamGradFunction >, ROOT::Math::VavilovAccurateCdf, ROOT::Math::VavilovAccuratePdf, ROOT::Math::VavilovAccurateQuantile, ROOT::Math::WrappedMultiTF1Templ< T >, ROOT::Math::WrappedMultiTF1Templ< double >, ROOT::Math::WrappedParamFunction< FuncPtr >, ROOT::Math::WrappedParamFunctionGen< FuncPtr >, and ROOT::Math::WrappedTF1.
Evaluate the function at a point x[].
Compatible method with multi-dimensional functions.
Definition at line 175 of file IFunction.h.
|
inline |
multidim-like interface
Definition at line 187 of file IParamFunction.h.
Evaluate the function at a point x.
Use the a pure virtual private method DoEval which must be implemented by sub-classes.
Definition at line 171 of file IFunction.h.
|
inline |
Evaluate function at a point x and for given parameters p.
This method does not change the internal status of the function (internal parameter values). If for some reason one prefers caching the parameter values, SetParameters(p) and then operator()(x) should be called. Use the pure virtual function DoEvalPar to implement it
Definition at line 178 of file IParamFunction.h.
|
inlinevirtualinherited |
Return the name of the i-th parameter (starting from zero) Overwrite if want to avoid the default name ("Par_0, Par_1, ...").
Reimplemented in ROOT::Math::VavilovAccurateCdf, ROOT::Math::VavilovAccuratePdf, ROOT::Math::VavilovAccurateQuantile, ROOT::Math::WrappedMultiTF1Templ< T >, ROOT::Math::WrappedMultiTF1Templ< double >, and ROOT::Math::WrappedTF1.
Definition at line 86 of file IParamFunction.h.
|
pure virtualinherited |
Access the parameter values.
Implemented in ROOT::Math::MultiDimParamFunctionAdapter, ROOT::Math::MultiDimParamGradFunctionAdapter, ROOT::Math::ParamFunction< IParamGradFunction >, ROOT::Math::VavilovAccurateCdf, ROOT::Math::VavilovAccuratePdf, ROOT::Math::VavilovAccurateQuantile, ROOT::Math::WrappedMultiTF1Templ< T >, ROOT::Math::WrappedMultiTF1Templ< double >, ROOT::Math::WrappedParamFunction< FuncPtr >, ROOT::Math::WrappedParamFunctionGen< FuncPtr >, and ROOT::Math::WrappedTF1.
|
pure virtualinherited |
Set the parameter values.
| p | vector of doubles containing the parameter values. |
to be defined: can user change number of params ? At the moment no.
Implemented in ROOT::Math::MultiDimParamFunctionAdapter, ROOT::Math::MultiDimParamGradFunctionAdapter, ROOT::Math::ParamFunction< IParamGradFunction >, ROOT::Math::VavilovAccurateCdf, ROOT::Math::VavilovAccuratePdf, ROOT::Math::VavilovAccurateQuantile, ROOT::Math::WrappedMultiTF1Templ< T >, ROOT::Math::WrappedMultiTF1Templ< double >, ROOT::Math::WrappedParamFunction< FuncPtr >, ROOT::Math::WrappedParamFunctionGen< FuncPtr >, and ROOT::Math::WrappedTF1.
