/usr/include/openturns/swig/NumericalMathFunction.i is in libopenturns-dev 1.5-7build2.
This file is owned by root:root, with mode 0o644.
The actual contents of the file can be viewed below.
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// @author schueller
// @date 2012-01-02 11:44:01 +0100 (Mon, 02 Jan 2012)
%{
#include "NumericalMathFunction.hxx"
#include "PythonNumericalMathEvaluationImplementation.hxx"
%}
%include BaseFuncCollection.i
OTTypedInterfaceObjectHelper(NumericalMathFunction)
//OTTypedCollectionInterfaceObjectHelper(NumericalMathFunction)
%typemap(in) const NumericalMathFunctionCollection & {
void * ptr = 0;
if (SWIG_IsOK(SWIG_ConvertPtr($input, (void **) &$1, $1_descriptor, 0))) {
// From interface class, ok
} else if (SWIG_IsOK(SWIG_ConvertPtr($input, &ptr, SWIG_TypeQuery("OT::Basis *"), 0))) {
// From Implementation*
OT::Basis * p_impl = reinterpret_cast< OT::Basis * >( ptr );
$1 = new OT::Collection<OT::NumericalMathFunction>(*p_impl);
} else {
$1 = OT::buildCollectionFromPySequence< OT::NumericalMathFunction >( $input );
}
}
%typemap(typecheck,precedence=SWIG_TYPECHECK_POINTER) const NumericalMathFunctionCollection & {
$1 = SWIG_IsOK(SWIG_ConvertPtr($input, NULL, $1_descriptor, 0))
|| OT::canConvertCollectionObjectFromPySequence< OT::NumericalMathFunction >( $input )
|| SWIG_IsOK(SWIG_ConvertPtr($input, NULL, SWIG_TypeQuery("OT::Basis *"), 0));
}
%apply const NumericalMathFunctionCollection & { const OT::Collection<OT::NumericalMathFunction> & };
%template(NumericalMathFunctionCollection) OT::Collection<OT::NumericalMathFunction>;
%template(NumericalMathFunctionPersistentCollection) OT::PersistentCollection<OT::NumericalMathFunction>;
%include NumericalMathFunction_doc.i
%include NumericalMathFunction.hxx
//%copyctor NumericalMathFunction;
namespace OT {
%extend NumericalMathFunction {
NumericalMathFunction(PyObject * pyObj)
{
void * ptr = 0;
if (SWIG_IsOK(SWIG_ConvertPtr(pyObj, &ptr, SWIG_TypeQuery("OT::Object *"), 0)))
{
throw OT::InvalidArgumentException(HERE) << "Argument should be a pure python object";
}
return new OT::NumericalMathFunction(OT::convert<OT::_PyObject_, OT::NumericalMathFunction>(pyObj));
}
NumericalMathFunction(const NumericalMathFunction & other)
{
return new OT::NumericalMathFunction( other );
}
}
}
%pythoncode %{
# We have to make sure the submodule is loaded with absolute path
import openturns.typ
class OpenTURNSPythonFunction(object):
"""
Override NumericalMathFunction from Python.
Parameters
----------
n : positive int
the input dimension
p : positive int
the output dimension
Notes
-----
You have to overload the function:
_exec(X): single evaluation, X is a sequence of float,
returns a sequence of float
You can also optionally override these functions:
_exec_sample(X): multiple evaluations, X is a 2-d float sequence,
returns a 2-d sequence of float
_gradient(X): gradient, X is a sequence of float,
returns a 2-d float sequence
_hessian(X): hessian, X is a sequence of float,
returns a 3-d float sequence
"""
def __init__(self, n=0, p=0):
try:
self.__n = int(n)
except:
raise TypeError('n argument is not an integer.')
try:
self.__p = int(p)
except:
raise TypeError('p argument is not an integer.')
self.__descIn = list(map(lambda i: 'x' + str(i), range(n)))
self.__descOut = list(map(lambda i: 'y' + str(i), range(p)))
def setInputDescription(self, descIn):
if (len(descIn) != self.__n):
raise ValueError('Input description size does NOT match input dimension')
self.__descIn = descIn
def getInputDescription(self):
return self.__descIn
def setOutputDescription(self, descOut):
if (len(descOut) != self.__p):
raise ValueError('Output description size does NOT match output dimension')
self.__descOut = descOut
def getOutputDescription(self):
return self.__descOut
def getInputDimension(self):
return self.__n
def getOutputDimension(self):
return self.__p
def __str__(self):
return 'OpenTURNSPythonFunction( %s #%d ) -> %s #%d' % (self.__descIn, self.__n, self.__descOut, self.__p)
def __repr__(self):
return self.__str__()
def __call__(self, X):
Y = None
try:
pt = openturns.typ.NumericalPoint(X)
except TypeError:
try:
ns = openturns.typ.NumericalSample(X)
except TypeError:
raise TypeError('Expect a 1-d or 2-d float sequence as argument')
else:
Y = self._exec_sample(ns)
else:
Y = self._exec(pt)
return Y
def _exec(self, X):
raise RuntimeError('You must define a method _exec(X) -> Y, where X and Y are 1-d float sequence objects')
def _exec_sample(self, X):
res = list()
for point in X:
res.append(self._exec(point))
return res
def _exec_point_on_exec_sample(self, X):
"""Implement exec from exec_sample."""
return self._exec_sample([X])[0]
class PythonFunction(NumericalMathFunction):
"""
Override NumericalMathFunction from Python.
Parameters
----------
n : positive int
the input dimension
p : positive int
the output dimension
func : a callable python object
called on a single point
Default is None.
func_sample : a callable python object
called on multiple points at once
Default is None.
gradient : a callable python objects
returns the gradient as a 2-d float sequence
Default is None (uses finite-difference).
hessian : a callable python object
returns the hessian as a 3-d float sequence
Default is None (uses finite-difference).
Notes
-----
You may provide either one of func or func_sample arguments
"""
def __new__(self, n, p, func=None, func_sample=None, gradient=None, hessian=None):
if func == None and func_sample == None:
raise RuntimeError('no func nor func_sample given.')
instance = OpenTURNSPythonFunction(n, p)
import collections
if func != None:
if not isinstance(func, collections.Callable):
raise RuntimeError('func argument is not callable.')
instance._exec = func
if func_sample != None:
if not isinstance(func_sample, collections.Callable):
raise RuntimeError('func_sample argument is not callable.')
instance._exec_sample = func_sample
if func == None:
instance._exec = instance._exec_point_on_exec_sample
if gradient != None:
if not isinstance(gradient, collections.Callable):
raise RuntimeError('gradient argument is not callable.')
instance._gradient = gradient
if hessian != None:
if not isinstance(hessian, collections.Callable):
raise RuntimeError('hessian argument is not callable.')
instance._hessian = hessian
return NumericalMathFunction(instance)
%}
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