Nonobtuse triangulations of PSLGs

Abstract

We show that any planar straight line graph (PSLG) with n vertices has a conforming triangulation by O(n2.5) nonobtuse triangles (all angles ≤ 90), answering the question of whether any polynomial bound exists. A nonobtuse triangulation is Delaunay, so this result also improves a previous O(n3) bound of Eldesbrunner and Tan for conforming Delaunay triangulations of PSLGs. In the special case that the PSLG is the triangulation of a simple polygon, we will show that only O(n2) triangles are needed, improving an O(n4) bound of Bern and Eppstein. We also show that for any ε >0, every PSLG has a conforming triangulation with O(n2/ε2) elements and with all angles bounded above by 90 + ε. This improves a result of S. Mitchell when ε = 3 π /8 = 67.5 and Tan when ε = 7π/30 =42.