Fast approximation algorithms for p-centres in large δ-hyperbolic graphs

Abstract

We provide a quasilinear time algorithm for the p-center problem with an additive error less than or equal to 3 times the input graph's hyperbolic constant. Specifically, for the graph G=(V,E) with n vertices, m edges and hyperbolic constant δ, we construct an algorithm for p-centers in time O(p(δ+1)(n+m)(n)) with radius not exceeding rp + δ when p ≤ 2 and rp + 3δ when p ≥ 3, where rp are the optimal radii. Prior work identified p-centers with accuracy rp+δ but with time complexity O((n3 n + n2m)(diam(G))) which is impractical for large graphs.