Improved Approximation Guarantees for Lower-Bounded Facility Location

Abstract

We consider the lower-bounded facility location () problem (also sometimes called load-balanced facility location), which is a generalization of uncapacitated facility location (), where each open facility is required to serve a certain minimum amount of demand. More formally, an instance of is specified by a set of facilities with facility-opening costs \fi\, a set of clients, and connection costs \cij\ specifying the cost of assigning a client j to a facility i, where the cijs form a metric. A feasible solution specifies a subset F of facilities to open, and assigns each client j to an open facility i(j)∈ F so that each open facility serves at least M clients, where M is an input parameter. The cost of such a solution is Σi∈ Ffi+Σj ci(j)j, and the goal is to find a feasible solution of minimum cost. The current best approximation ratio for is 448 Svitkina08. We substantially advance the state-of-the-art for by devising an approximation algorithm for that achieves a significantly-improved approximation guarantee of 82.6. Our improvement comes from a variety of ideas in algorithm design and analysis, which also yield new insights into .