std::auto_ptr<QuadEdge>
QuadEdge::connect(QuadEdge &a, QuadEdge &b)
{
std::auto_ptr<QuadEdge> q0 = makeEdge(a.dest(), b.orig());
splice(*q0, a.lNext());
splice(q0->sym(), b);
return q0;
}
QuadEdge& IncrementalDelaunayTriangulator::insertSite(const Vertex &v)
{
/**
* This code is based on Guibas and Stolfi (1985), with minor modifications
* and a bug fix from Dani Lischinski (Graphic Gems 1993). (The modification
* I believe is the test for the inserted site falling exactly on an
* existing edge. Without this test zero-width triangles have been observed
* to be created)
*/
QuadEdge *e = subdiv->locate(v);
if(!e) {
throw LocateFailureException("");
}
if (subdiv->isVertexOfEdge(*e, v)) {
// point is already in subdivision.
return *e;
}
else if (subdiv->isOnEdge(*e, v.getCoordinate())) {
// the point lies exactly on an edge, so delete the edge
// (it will be replaced by a pair of edges which have the point as a vertex)
e = &e->oPrev();
subdiv->remove(e->oNext());
}
/**
* Connect the new point to the vertices of the containing triangle
* (or quadrilateral, if the new point fell on an existing edge.)
*/
QuadEdge* base = &subdiv->makeEdge(e->orig(), v);
QuadEdge::splice(*base, *e);
QuadEdge *startEdge = base;
do {
base = &subdiv->connect(*e, base->sym());
e = &base->oPrev();
} while (&e->lNext() != startEdge);
// Examine suspect edges to ensure that the Delaunay condition
// is satisfied.
do {
QuadEdge* t = &e->oPrev();
if (t->dest().rightOf(*e) &&
v.isInCircle(e->orig(), t->dest(), e->dest())) {
QuadEdge::swap(*e);
e = &e->oPrev();
} else if (&e->oNext() == startEdge) {
return *base; // no more suspect edges.
} else {
e = &e->oNext().lPrev();
}
} while (true);
}