A Polynomial-Time Approximation Scheme for Facility Location on Planar Graphs

Abstract

We consider the classic Facility Location problem on planar graphs (non-uniform, uncapacitated). Given an edge-weighted planar graph G, a set of clients C⊂eq V(G), a set of facilities F⊂eq V(G), and opening costs open F R≥ 0, the goal is to find a subset D of F that minimizes Σc ∈ C f ∈ D dist(c,f) + Σf ∈ D open(f). The Facility Location problem remains one of the most classic and fundamental optimization problem for which it is not known whether it admits a polynomial-time approximation scheme (PTAS) on planar graphs despite significant effort for obtaining one. We solve this open problem by giving an algorithm that for any >0, computes a solution of cost at most (1+) times the optimum in time n2O(-2 (1/)).