Improved approximation algorithm for Fault-Tolerant Facility Placement

Abstract

We consider the Fault-Tolerant Facility Placement problem (FTFP), which is a generalization of the classical Uncapacitated Facility Location problem (UFL). In the FTFP problem we have a set of clients C and a set of facilities F. Each facility i ∈ F can be opened many times. For each opening of facility i we pay fi ≥ 0. Our goal is to connect each client j ∈ C with rj ≥ 1 open facilities in a way that minimizes the total cost of open facilities and established connections. In a series of recent papers FTFP was essentially reduced to FTFL and then to UFL showing it could be approximated with ratio 1.575. In this paper we show that FTFP can actually be approximated even better. We consider approximation ratio as a function of r = minj ∈ C rj (minimum requirement of a client). With increasing r the approximation ratio of our algorithm λr converges to one. Furthermore, for r > 1 the value of λr is less than 1.463 (hardness of approximation of UFL). We also show a lower bound of 1.278 for the approximability of the Fault-Tolerant Facility Location problem (FTFL) for arbitrary r. Already for r > 3 we obtain that FTFP can be approximated with ratio 1.275, showing that under standard complexity theoretic assumptions FTFP is strictly better approximable than FTFL.