Delaunay Triangulations of Degenerate Point Sets

Abstract: The Delaunay triangulation (DT) is one of the most common and useful triangulations of point sets P in the plane. DT is not unique when P is degenerate, specifically when it contains quadruples of co-circular points. One way to achieve uniqueness is by applying a small (or infinitesimal) perturbation to P .We consider a specific perturbation of such degenerate sets, in which the coordinates of each point are independently perturbed by normally distributed small quantities, and investigate the effect of such pe… Show more