Approximate Euclidean shortest paths in polygonal domains

Abstract

Given a set P of h pairwise disjoint simple polygonal obstacles in R2 defined with n vertices, we compute a sketch of P whose size is independent of n, depending only on h and the input parameter ε. We utilize to compute a (1+ε)-approximate geodesic shortest path between the two given points in O(n + h((n) + (h)1+δ + (1εhε))) time. Here, ε is a user parameter, and δ is a small positive constant (resulting from the time for triangulating the free space of P using the algorithm in journals/ijcga/Bar-YehudaC94). Moreover, we devise a (2+ε)-approximation algorithm to answer two-point Euclidean distance queries for the case of convex polygonal obstacles.