MittelmannBndryCntrlNeum4 Class Reference

Class implementating Example 8. More...

#include <MittelmannBndryCntrlNeum.hpp>

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List of all members.

Public Member Functions

 MittelmannBndryCntrlNeum4 ()
virtual ~MittelmannBndryCntrlNeum4 ()
virtual bool InitializeProblem (Index N)
 Initialize internal parameters, where N is a parameter determining the problme size.

Protected Member Functions

virtual Number y_d_cont (Number x1, Number x2) const
 Target profile function for y.
virtual Number d_cont (Number x1, Number x2, Number y) const
 Forcing function for the elliptic equation.
virtual Number d_cont_dy (Number x1, Number x2, Number y) const
 First partial derivative of forcing function w.r.t.
virtual Number d_cont_dydy (Number x1, Number x2, Number y) const
 Second partial derivative of forcing function w.r.t y,y.
virtual bool d_cont_dydy_alwayszero () const
 returns true if second partial derivative of d_cont w.r.t.
virtual Number b_cont (Number x1, Number x2, Number y, Number u) const
 Function in Neuman boundary condition.
virtual Number b_cont_dy (Number x1, Number x2, Number y, Number u) const
 First partial derivative of b_cont w.r.t.
virtual Number b_cont_du (Number x1, Number x2, Number y, Number u) const
 First partial derivative of b_cont w.r.t.
virtual Number b_cont_dydy (Number x1, Number x2, Number y, Number u) const
 Second partial derivative of b_cont w.r.t.
virtual bool b_cont_dydy_alwayszero () const
 returns true if second partial derivative of b_cont w.r.t.

Private Member Functions

hide implicitly defined contructors copy operators



 MittelmannBndryCntrlNeum4 (const MittelmannBndryCntrlNeum4 &)
MittelmannBndryCntrlNeum4operator= (const MittelmannBndryCntrlNeum4 &)
 Overloaded Equals Operator.

Detailed Description

Class implementating Example 8.

Definition at line 488 of file MittelmannBndryCntrlNeum.hpp.

Constructor & Destructor Documentation

MittelmannBndryCntrlNeum4::MittelmannBndryCntrlNeum4 (  )  [inline]

Definition at line 491 of file MittelmannBndryCntrlNeum.hpp.

virtual MittelmannBndryCntrlNeum4::~MittelmannBndryCntrlNeum4 (  )  [inline, virtual]

Definition at line 494 of file MittelmannBndryCntrlNeum.hpp.

MittelmannBndryCntrlNeum4::MittelmannBndryCntrlNeum4 ( const MittelmannBndryCntrlNeum4  )  [private]

Member Function Documentation

virtual bool MittelmannBndryCntrlNeum4::InitializeProblem ( Index  N  )  [inline, virtual]

Initialize internal parameters, where N is a parameter determining the problme size.

This returns false, if N has an invalid value.

Implements RegisteredTNLP.

Definition at line 497 of file MittelmannBndryCntrlNeum.hpp.

virtual Number MittelmannBndryCntrlNeum4::y_d_cont ( Number  x1,
Number  x2 
) const [inline, protected, virtual]

Target profile function for y.

Implements MittelmannBndryCntrlNeumBase.

Definition at line 515 of file MittelmannBndryCntrlNeum.hpp.

virtual Number MittelmannBndryCntrlNeum4::d_cont ( Number  x1,
Number  x2,
Number  y 
) const [inline, protected, virtual]

Forcing function for the elliptic equation.

Implements MittelmannBndryCntrlNeumBase.

Definition at line 520 of file MittelmannBndryCntrlNeum.hpp.

virtual Number MittelmannBndryCntrlNeum4::d_cont_dy ( Number  x1,
Number  x2,
Number  y 
) const [inline, protected, virtual]

First partial derivative of forcing function w.r.t.

y

Implements MittelmannBndryCntrlNeumBase.

Definition at line 525 of file MittelmannBndryCntrlNeum.hpp.

virtual Number MittelmannBndryCntrlNeum4::d_cont_dydy ( Number  x1,
Number  x2,
Number  y 
) const [inline, protected, virtual]

Second partial derivative of forcing function w.r.t y,y.

Implements MittelmannBndryCntrlNeumBase.

Definition at line 530 of file MittelmannBndryCntrlNeum.hpp.

virtual bool MittelmannBndryCntrlNeum4::d_cont_dydy_alwayszero (  )  const [inline, protected, virtual]

returns true if second partial derivative of d_cont w.r.t.

y,y is always zero.

Implements MittelmannBndryCntrlNeumBase.

Definition at line 536 of file MittelmannBndryCntrlNeum.hpp.

virtual Number MittelmannBndryCntrlNeum4::b_cont ( Number  x1,
Number  x2,
Number  y,
Number  u 
) const [inline, protected, virtual]

Function in Neuman boundary condition.

Implements MittelmannBndryCntrlNeumBase.

Definition at line 541 of file MittelmannBndryCntrlNeum.hpp.

virtual Number MittelmannBndryCntrlNeum4::b_cont_dy ( Number  x1,
Number  x2,
Number  y,
Number  u 
) const [inline, protected, virtual]

First partial derivative of b_cont w.r.t.

y

Implements MittelmannBndryCntrlNeumBase.

Definition at line 546 of file MittelmannBndryCntrlNeum.hpp.

virtual Number MittelmannBndryCntrlNeum4::b_cont_du ( Number  x1,
Number  x2,
Number  y,
Number  u 
) const [inline, protected, virtual]

First partial derivative of b_cont w.r.t.

u

Implements MittelmannBndryCntrlNeumBase.

Definition at line 551 of file MittelmannBndryCntrlNeum.hpp.

virtual Number MittelmannBndryCntrlNeum4::b_cont_dydy ( Number  x1,
Number  x2,
Number  y,
Number  u 
) const [inline, protected, virtual]

Second partial derivative of b_cont w.r.t.

y,y

Implements MittelmannBndryCntrlNeumBase.

Definition at line 556 of file MittelmannBndryCntrlNeum.hpp.

virtual bool MittelmannBndryCntrlNeum4::b_cont_dydy_alwayszero (  )  const [inline, protected, virtual]

returns true if second partial derivative of b_cont w.r.t.

y,y is always zero.

Implements MittelmannBndryCntrlNeumBase.

Definition at line 562 of file MittelmannBndryCntrlNeum.hpp.

MittelmannBndryCntrlNeum4& MittelmannBndryCntrlNeum4::operator= ( const MittelmannBndryCntrlNeum4  )  [private]

Overloaded Equals Operator.

Reimplemented from MittelmannBndryCntrlNeumBase.

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