/usr/include/ITK-4.5/itkGeometricalQuadEdge.hxx is in libinsighttoolkit4-dev 4.5.0-3.
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*
* Copyright Insight Software Consortium
*
* Licensed under the Apache License, Version 2.0 (the "License");
* you may not use this file except in compliance with the License.
* You may obtain a copy of the License at
*
* http://www.apache.org/licenses/LICENSE-2.0.txt
*
* Unless required by applicable law or agreed to in writing, software
* distributed under the License is distributed on an "AS IS" BASIS,
* WITHOUT WARRANTIES OR CONDITIONS OF ANY KIND, either express or implied.
* See the License for the specific language governing permissions and
* limitations under the License.
*
*=========================================================================*/
#ifndef __itkGeometricalQuadEdge_hxx
#define __itkGeometricalQuadEdge_hxx
#include "itkGeometricalQuadEdge.h"
#include "vcl_limits.h"
#include <iostream>
namespace itk
{
/**
*/
template< typename TVRef, typename TFRef,
typename TPrimalData, typename TDualData, bool PrimalDual >
const typename GeometricalQuadEdge< TVRef, TFRef,
TPrimalData, TDualData, PrimalDual >::OriginRefType
GeometricalQuadEdge< TVRef, TFRef, TPrimalData, TDualData, PrimalDual >::m_NoPoint =
vcl_numeric_limits< OriginRefType >::max();
/**
* Constructor
*/
template< typename TVRef, typename TFRef,
typename TPrimalData, typename TDualData, bool PrimalDual >
GeometricalQuadEdge< TVRef, TFRef, TPrimalData, TDualData, PrimalDual >
::GeometricalQuadEdge()
{
this->m_Origin = m_NoPoint;
this->m_DataSet = false;
}
/**
*/
template< typename TVRef, typename TFRef,
typename TPrimalData, typename TDualData, bool PrimalDual >
bool GeometricalQuadEdge< TVRef, TFRef, TPrimalData, TDualData, PrimalDual >::SetLnextRingWithSameLeftFace(
const DualOriginRefType faceGeom,
int maxSize)
{
#ifndef NDEBUG
if ( !this->IsLnextSharingSameFace(maxSize) )
{
itkQEDebugMacro("Lnext() edges do NOT share the same Left().");
return ( false );
}
#endif
IteratorGeom it = this->BeginGeomLnext();
while ( maxSize && ( it != this->EndGeomLnext() ) )
{
it.Value()->SetLeft(faceGeom);
it++;
maxSize--;
}
return ( true );
}
/**
* \brief Check wether the Lnext() ring of "this" edge is exactly of
* size three AND if those three edges all share the same Left().
* @return Returns true when the Lnext() ring is the one of a triangle.
* Returns false otherwise.
*/
template< typename TVRef, typename TFRef,
typename TPrimalData, typename TDualData, bool PrimalDual >
bool GeometricalQuadEdge< TVRef, TFRef, TPrimalData, TDualData, PrimalDual >::IsLnextOfTriangle()
{
return ( this->IsLnextSharingSameFace(3) );
}
/**
* \brief Check wether the incoming argument is in the Onext() ring
* of "this" edge or not.
* @param b The edge to test.
* @return Returns true when "this" edge and the incoming argument are
* in the same Onext() ring. Returns false otherwise.
*/
template< typename TVRef, typename TFRef,
typename TPrimalData, typename TDualData, bool PrimalDual >
bool GeometricalQuadEdge< TVRef, TFRef, TPrimalData, TDualData, PrimalDual >::IsInOnextRing(Self *b)
{
for ( IteratorGeom it = this->BeginGeomOnext();
it != this->EndGeomOnext();
it++ )
{
if ( b == it.Value() )
{
return true;
}
}
return false;
}
/**
* \brief Check wether the incoming argument is in the Lnext() ring
* of "this" edge or not.
* @param b The edge to test.
* @return Returns true when "this" edge and the incoming argument are
* in the same Lnext() ring. Returns false otherwise.
*/
template< typename TVRef, typename TFRef,
typename TPrimalData, typename TDualData, bool PrimalDual >
bool GeometricalQuadEdge< TVRef, TFRef, TPrimalData, TDualData, PrimalDual >::IsInLnextRing(Self *b)
{
for ( IteratorGeom it = this->BeginGeomLnext();
it != this->EndGeomLnext();
it++ )
{
if ( b == it.Value() )
{
return true;
}
}
return false;
}
/**
* \brief Check wether edge's Origin is internal to the mesh (as opposed
* to being on the boundary) by looking if all the edges in the
* Onext() ring have a face set on both their Left() and Right()
* side.
*/
template< typename TVRef, typename TFRef,
typename TPrimalData, typename TDualData, bool PrimalDual >
bool
GeometricalQuadEdge< TVRef, TFRef, TPrimalData, TDualData, PrimalDual >
::IsOriginInternal() const
{
ConstIteratorGeom it = this->BeginGeomOnext();
while ( it != this->EndGeomOnext() )
{
typedef typename ConstIteratorGeom::QuadEdgeType QuadEdgeType;
const QuadEdgeType *value = it.Value();
if ( !value->IsInternal() ) { return false; }
++it;
}
return true;
}
/**
* \brief Consider the first few edges in Lnext() ring of "this" edge.
* Check wether those edges all share the same Left().
* @param maxSize Looks at most maxSize edges in the Lnext() ring.
* @return Returns true when the Lnext() ring share THE same
* Left() faces. Return false otherwise.
*/
template< typename TVRef, typename TFRef,
typename TPrimalData, typename TDualData, bool PrimalDual >
bool GeometricalQuadEdge< TVRef, TFRef, TPrimalData, TDualData, PrimalDual >::IsLnextSharingSameFace(int maxSize)
{
IteratorGeom it = this->BeginGeomLnext();
while ( maxSize && ( it != this->EndGeomLnext() ) )
{
// The condition isn't complicated: if left faces aren't set,
// continue, if just one is set return false, if both are set
// check if the face is the same
bool facesAreNotSet = !this->IsLeftSet() && !it.Value()->IsLeftSet();
bool facesAreTheSame = this->GetLeft() == it.Value()->GetLeft();
bool facesAreSet = this->IsLeftSet() && it.Value()->IsLeftSet();
//
// FIXME: This boolean expression can be simplified.
// ALEX : what about the version below ?
//
// if ( this->IsLeftSet() ) // one left set
// {
// if (it.Value()->IsLeftSet()) // two left set
// {
// if( !(this->GetLeft() == it.Value()->GetLeft()) )
// {
// return( false ); // not same face
// }
// }
// else // only one set
// {
// return( false );
// }
// }
// else // one not set
// {
// if(it.Value()->IsLeftSet()) // only one set
// {
// return( false );
// }
// }
//
if ( !( facesAreNotSet || ( facesAreSet && facesAreTheSame ) ) )
{
return ( false );
}
it++;
maxSize--;
}
if ( it != this->EndGeomLnext() )
{
// The Lnext ring is bigger than the caller expected
return ( false );
}
return ( true );
}
/**
*/
template< typename TVRef, typename TFRef,
typename TPrimalData, typename TDualData, bool PrimalDual >
typename GeometricalQuadEdge< TVRef, TFRef, TPrimalData, TDualData, PrimalDual >::Self *
GeometricalQuadEdge< TVRef, TFRef, TPrimalData, TDualData, PrimalDual >::GetNextBorderEdgeWithUnsetLeft(Self *edgeTest)
{
// Definition: an edge is said to be a boundary edge when it is adjacent to
// noface i.e. when at least one of the faces edge->GetLeft() or
// edge->GetRight() is unset. Definition: an point is said to be a boundary
// point when at least one of the edges of it's Onext() ring is a boundary
// edge.
//
// Assume "this" edge belongs to a triangulation (i.e. it belongs to a QEMesh
// which represents a 2-manifold) which possesses a boundary. Assume "this"
// edge instance is a boundary edge. Let us denote by P the point which is
// the origin of "this" edge i.e. P is this->Origin(). By definition P is a
// boundary point. Then AT LEAST two [see the note below] edges of the
// Onext() ring of P [which all have the point P as Origin()] are themselves
// boundary edges. And among those boundary edges AT LEAST one has it's
// Left() face unset. By iterating over the Onext() ring (which defines a
// local ordering on edges) this method searches for the first edge whose
// Left() face is unset AND which is encountered AFTER edgeTest.
//
// @param edgeTest When present, this edge will be considered as
// the entry edge in the Onext() ring. When absent it shall
// be defaulted to "this" edge. (see the warning below).
// @return When "this" edge is a boundary edge, return the first
// edge in "this" Onext() ring whose Left() face is unset
// AND located after edgeTest.
// When "this" edge is NOT a boundary edge the 0 is
// returned.
// @warning When the Mesh possessing "this" edge is a 2-manifold
// then result of this method is unique in the sense that
// it is independent from the edgeTest parameter.
// But when the Mesh is not 2-manifold (this state can
// happen at intermediary stages of the building process,
// or during "surgical" operations on the Mesh, and
// even though the Mesh represents a triangulation)
// the result of this method is not unique in the sense
// that the result depends on the edgeTest parameter.
// Let us illusatre this dependence by considering a
// Mesh (which is a triangulation) which is not a 2-manifold.
// Assume the point P (the origin of "this" edge i.e.
// P = this->Originv()) is TWICE on the border i.e. it
// is adjacent twice to noface. We can consider the situation
// of the following diagram, which depicts some Onext()
// ring around point P:
//
// \ / //
// \ * / //
// i3 b2 counter-clockwise //
// * \ / NO FACE Onext() order. //
// \ / //
// ----b4-----P----b1------ //
// /|\ //
// NO FACE / | \ //
// / | \ * <------ a * indicates the //
// / | \ the presence of a face //
// / | \ //
// b5 i6 i7 //
// / * | * \ //
// / | \ //
//
// On this example, and if we assume the Onext() oder is
// represented counter-clockwise, the edges are ordered as
// follows:
// b1, b2, i3, b4, b5, i6, i7
// (when arbitrarily starting at edge b1).
// We have four Boundary edges labeled b1, b2, b4, b5 and
// we have three internal edges (i.e. non boundary edges)
// labeled i3, i6 and i7.
// Depending on edgeTest, the result of this method
// will NOT return the same edge:
// - when edgeTest == b5 (or i6 or i7 or b1) then the edge
// b1 will be returned,
// - when edgeTest == b2 (or i3 or b4) then the edge
// b4 will be returned,
// Eventually, when edgeTest is absent, the result shall
// depend on the position of "this" in the Onext() ring().
//
// Be sure the Onext ring isn't already full
if ( this->IsOriginInternal() )
{
itkQEDebugMacro("Internal point.");
return ( 0 );
}
// Update reference
edgeTest = ( !edgeTest ) ? this : edgeTest;
// On efficiency purposes
if ( edgeTest->IsIsolated() )
{
return ( edgeTest );
}
// Ok, no more special cases
IteratorGeom it = edgeTest->BeginGeomOnext();
IteratorGeom end = edgeTest->EndGeomOnext();
while ( it != end )
{
if ( !it.Value()->IsLeftSet() )
{
return ( it.Value() );
}
it++;
}
// No border edge found
itkQEDebugMacro("Unfound border edge.");
return ( 0 );
}
/**
*/
template< typename TVRef, typename TFRef,
typename TPrimalData, typename TDualData, bool PrimalDual >
bool GeometricalQuadEdge< TVRef, TFRef, TPrimalData, TDualData, PrimalDual >::InsertAfterNextBorderEdgeWithUnsetLeft(
Self *isol,
Self *hint)
{
// When the geometry of isol is set it must match the
// one of "this" Origin(). If the geometry is not set, we assume
// that both Origin are the same, regardless their actual value.
// Note: The purpose of this test is to avoid introducing some
// incoherence in the geometry at Origin().
// The things should go this way:
// 1/ when the geometry of "this" Origin is not set, then be paranoid
// and suspect the situation is already snafu:
// 1a/ if all edges of "this" Onext ring have an unset Origin()
// (the situation is coherent), then proceed (Result=0)
// whatever the value of isol.Origin() might be.
// 1b/ if one of the edges of "this" Onext ring has an Origin() set,
// then we deduce that there is already some geometrical
// incoherence at this->Origin() and exit this method (Result=1).
// 2/ Then when we didn't exit at stage 1, consider isol.Origin():
// 2a/ when isol.Origin() is absent proceed (result=0),
// 2b/ when isol.Origin() is present and Origin == isol.OriginSet then
// proceed (result=0),
// 2c/ when isol.Origin() is present and Origin != isol.OriginSet then
// exit (result=1).
//
// Here is what is implemented:
// +-----------+----------------+--------------------------+--------+
// | OriginSet | isol.OriginSet | Origin == isol.OriginSet | Result |
// +-----------+----------------+--------------------------+--------+
// | 0 | 0 | 0 | 0 |
// | 0 | 0 | 1 | 0 |
// | 0 | 1 | 0 | 1 |
// | 0 | 1 | 1 | 1 |
// +-----------+----------------+--------------------------+--------+
// | 1 | 0 | 0 | 1 |
// | 1 | 0 | 1 | 1 |
// | 1 | 1 | 0 | 1 |
// | 1 | 1 | 1 | 0 |
// +-----------+----------------+--------------------------+--------+
//
if ( !( !( IsOriginSet() || isol->IsOriginSet() )
|| ( IsOriginSet()
&& isol->IsOriginSet()
&& ( m_Origin == isol->m_Origin ) )
)
)
{
itkQEDebugMacro("Isolated Origin() differs from this Origin.");
return ( false );
}
// Find out if this point has some room left for edge insertion:
Self *edgeAfter = this->GetNextBorderEdgeWithUnsetLeft(hint);
if ( !edgeAfter )
{
itkQEDebugMacro("This point is yet surrounded by faces.");
return ( false );
}
// Normally, an edge was found
edgeAfter->Splice(isol);
return ( true );
}
/**
*/
template< typename TVRef, typename TFRef,
typename TPrimalData, typename TDualData, bool PrimalDual >
bool GeometricalQuadEdge< TVRef, TFRef, TPrimalData, TDualData, PrimalDual >::ReorderOnextRingBeforeAddFace(
Self *second)
{
// Assume "this->Originv()" is a boundary point P that is thrice adjacent
// to noface and consider the given situation is the one depicted by
// the following diagram where:
// - P is "this->Originv()" instance,
// - the * (star) indicates the presence of a face,
// - b1, b2, b3, b4, b5, b6 denote boundary edges,
// - p denotes some generic point,
// - A and B denote some specific points we want to discuss,
// - the Onext() ring order is represented counter-clockwise
// [which is coherent with the definition of edge->GetRigth()]
// i.e. the ordering of the edges is:
// b1, b2, b3, b4, b5, b6, b1...
//
// p N p
// / \ O / \ //
// / \ / \ //
// / \ F / \ counter-clockwise //
// / b3 A b2 \ Onext() ring order //
// / \ C / \ //
// / * \ E / * \ //
// / \ / \ //
// A------b4------P------b1-------B //
// / \ //
// / \ //
// NO FACE / \ NO FACE //
// / \ //
// b5 b6 //
// / * \ //
// / \ //
// p---------------p //
//
// At P this Mesh doesn't represent a 2-manifold (since we are thrice
// on the boundary). Nevertheless such a situation could arise in
// intermediary stages (e.g. when building the Mesh, or during
// surgical changes on the Mesh).
// Now, assume we are asked to build the triangle [P, A, B]. Note
// that this request is not absurd since the current situation at
// P isn't the one of a 2-manifold: hence when building the current
// Onext() ring of P, we had not enough information to decide
// wheter b4.Onext() should be b5 or b1. It is ONLY when we are
// required to build the triangle [P, A, B] that we have the
// additional information that b4.Onext() is indeed b1.
// When we are required to build triangle [P, A, B], we hence
// need to change the Onext() ring order at P, i.e. we need to deal
// with the triangle [P, b5, b6] which currently prevents
// b4.Onext() to be b1. In other terms, when considering the
// additional information that b4.Onext() is b1, and before
// building the triangle [P, A, B], we need to reorder
// the Onext() ring of P from it's current state
// b1, b2, b3, b4, b5, b6, b1...
// to an order coherent with the [P, A, B] request, i.e.
// b1, b2, b5, b6, b3, b4, b1...
//
// In order to establish the "proper" Onext() ring at P we use
// two Splice operations. The algorithm goes:
// - first disconnect the piece of the surface containing the edge
// [PB] (it would be the same process if we chose [PA]) from
// the Onext() ring at P.
// - second, re-integrate the disconnected piece at the desired
// location i.e. side by side with [PA] (respectively [PB] if
// we chose [PA] at first stage).
// By "piece of surface containing the edge [PB]" we mean [all]
// the triangle[s] starting at [PB] in the Onext() order and
// having a left face set.
//
// We can illustrate this process on bit more general diagram than
// the last case (where the "piece of surface containing the edge
// [PB]" is constituted by two triangles) and when using
// the arguments of this method (i.e. [PA] = this and [PB] = second).
// The initial stage is the following (we note first=this=[PA] and
// second=[PB]) where the Onext() ring order is:
// first, b2, b3, second, b5, bsplice, b7, first...
//
// p N A //
// / \ O / \ //
// / \ / \ //
// / \ F / \ counter-clockwise //
// / b2 A first \ Onext() ring order //
// / \ C / \ //
// / * \ E / * \ //
// / \ / \ //
// p-------b3------P------b7-------p //
// /|\ //
// / | \ //
// NO FACE / | \ NO FACE //
// / | \ //
// second b5 bsplice //
// / * | * \ //
// / | \ //
// B-------p-------p //
//
// The first stage, implemented as
// second->Oprev()->Splice( bsplice ),
// yields the following diagram:
//
// p N A //
// / \ O / \ //
// / \ F / \ //
// / \ A / \ counter-clockwise //
// / b2 C first \ Onext() ring order //
// / \ E / \ //
// / * \ / * \ //
// / \ / \ //
// p-------b3------P------b7-------p //
// //
// NO FACE //
// //
// /|\ //
// / | \ //
// / | \ //
// / | \ //
// second b5 bsplice //
// / * | * \ //
// / | \ //
// B-------p-------p //
//
// and the second stage, implemented as
// first->Splice( bsplice ),
// yields the following diagram:
//
// A //
// B__ NO FACE / \ //
// | \__ / \ //
// | \__ / \ counter- //
// | second first \ clockwise for all //
// | \__ / \ //
// | * \__ / * \ //
// | \ / \ //
// p-------b5---------P------b7-------p //
// | __/|\ //
// | * __/ | \ //
// | / | \ NO FACE //
// | bsplice | \ //
// | __/ b2 b3 //
// p__/ | * \ //
// NO FACE | \ //
// p-------p //
//
Self *first = this;
// Making sure point adjacency is correct:
if ( first->GetOrigin() != second->GetOrigin() )
{
itkQEDebugMacro("Edges not adjacent at same point!");
return ( false );
}
if ( first->GetOnext() == second )
{
return ( true );
}
if ( first->IsLeftSet() )
{
itkQEDebugMacro("First should NOT have a left face.");
return ( false );
}
// Second is an internal edge.
if ( second->IsInternal() )
{
return ( false );
}
Self *bsplice; // Does not require initialisation;
// Disconnect the triangles containing second:
if ( second->IsLeftSet() )
{
bsplice = second->GetNextBorderEdgeWithUnsetLeft();
second->GetOprev()->Splice(bsplice);
}
else
{
// Orientation is localy clockwise:
bsplice = second;
second->GetOprev()->Splice(bsplice);
}
// Reconnect second after first:
first->Splice(bsplice);
return ( true );
}
// ---------------------------------------------------------------------
template< typename TVRef, typename TFRef,
typename TPrimalData, typename TDualData, bool PrimalDual >
void GeometricalQuadEdge< TVRef, TFRef, TPrimalData, TDualData, PrimalDual >::Disconnect()
{
if ( this->IsDisconnected() )
{
return;
}
// Update faces if the edge isn't a wire
if ( this->IsAtBorder() )
{
Self * e = ( this->IsRightSet() ) ? this->GetSym() : this;
IteratorGeom it = e->BeginGeomLnext();
while ( it != e->EndGeomLnext() )
{
it.Value()->UnsetLeft();
it++;
}
}
else if ( this->IsInternal() )
{
// Consolidate face
DualOriginRefType face = this->GetRight();
for ( IteratorGeom it = this->BeginGeomLnext();
it != this->EndGeomLnext();
it++ )
{
it.Value()->SetLeft(face);
}
}
// Hint edges
Self *e0 = this->GetOprev();
Self *e1 = this->GetLnext();
// Disconnect entries
if ( !this->IsOriginDisconnected() )
{
e0->Splice(this);
}
if ( !this->IsDestinationDisconnected() )
{
e1->Splice( this->GetSym() );
}
// Normally, this edge is converted to a simple wire
this->UnsetOrigin();
this->UnsetDestination();
this->UnsetLeft();
this->UnsetRight();
}
// ---------------------------------------------------------------------
template< typename TVRef, typename TFRef,
typename TPrimalData, typename TDualData, bool PrimalDual >
bool
GeometricalQuadEdge< TVRef, TFRef, TPrimalData, TDualData, PrimalDual >
::IsOriginSet() const
{
return ( this->m_Origin != m_NoPoint );
}
// ---------------------------------------------------------------------
template< typename TVRef, typename TFRef,
typename TPrimalData, typename TDualData, bool PrimalDual >
bool
GeometricalQuadEdge< TVRef, TFRef, TPrimalData, TDualData, PrimalDual >
::IsDestinationSet() const
{
const Self *p1 = this->GetSym();
if ( p1 == NULL )
{
return false; // FIXME: Is this the right answer ?
}
return p1->IsOriginSet();
}
// ---------------------------------------------------------------------
template< typename TVRef, typename TFRef,
typename TPrimalData, typename TDualData, bool PrimalDual >
bool
GeometricalQuadEdge< TVRef, TFRef, TPrimalData, TDualData, PrimalDual >
::IsRightSet() const
{
const DualType *p1 = this->GetRot();
if ( p1 == NULL )
{
return false; // FIXME: Is this the right answer ?
}
return p1->IsOriginSet();
}
// ---------------------------------------------------------------------
template< typename TVRef, typename TFRef,
typename TPrimalData, typename TDualData, bool PrimalDual >
bool
GeometricalQuadEdge< TVRef, TFRef, TPrimalData, TDualData, PrimalDual >
::IsLeftSet() const
{
const DualType *p1 = this->GetInvRot();
if ( p1 == NULL )
{
return false; // FIXME: Is this the right answer ?
}
return p1->IsOriginSet();
}
} // end of namespace itk
#endif
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