Large k-gons in a 1.5D Terrain

Abstract

Given is a 1.5D terrain T, i.e., an x-monotone polygonal chain in R2. For a given 2 k n, our objective is to approximate the largest area or perimeter convex polygon of exactly or at most k vertices inside T. For a constant k>3, we design an FPTAS that efficiently approximates the largest convex polygons with at most k vertices, within a factor (1-ε). For the case where k=2, we design an O(n) time exact algorithm for computing the longest line segment in T, and for k=3, we design an O(n n) time exact algorithm for computing the largest-perimeter triangle that lies within T.