Deterministic, Near-Linear -Approximation Algorithm for Geometric Bipartite Matching

Abstract

Given point sets A and B in Rd where A and B have equal size n for some constant dimension d and a parameter >0, we present the first deterministic algorithm that computes, in n·(-1 n)O(d) time, a perfect matching between A and B whose cost is within a (1+) factor of the optimal under any p-norm. Although a Monte-Carlo algorithm with a similar running time is proposed by Raghvendra and Agarwal [J. ACM 2020], the best-known deterministic -approximation algorithm takes (n3/2) time. Our algorithm constructs a (refinement of a) tree cover of Rd, and we develop several new tools to apply a tree-cover based approach to compute an -approximate perfect matching.