Higher-Order Triangular-Distance Delaunay Graphs: Graph-Theoretical Properties

Abstract

We consider an extension of the triangular-distance Delaunay graphs (TD-Delaunay) on a set P of points in the plane. In TD-Delaunay, the convex distance is defined by a fixed-oriented equilateral triangle , and there is an edge between two points in P if and only if there is an empty homothet of having the two points on its boundary. We consider higher-order triangular-distance Delaunay graphs, namely k-TD, which contains an edge between two points if the interior of the homothet of having the two points on its boundary contains at most k points of P. We consider the connectivity, Hamiltonicity and perfect-matching admissibility of k-TD. Finally we consider the problem of blocking the edges of k-TD.