A Distributed Minimum Cut Approximation Scheme

Abstract

In this paper, we study the problem of approximating the minimum cut in a distributed message-passing model, the CONGEST model. The minimum cut problem has been well-studied in the context of centralized algorithms. However, there were no known non-trivial algorithms in the distributed model until the recent work of Ghaffari and Kuhn. They gave algorithms for finding cuts of size O(ε-1λ) and (2+ε)λ in O(D)+O(n1/2+ε) rounds and O(D+n) rounds respectively, where λ is the size of the minimum cut. This matches the lower bound they provided up to a polylogarithmic factor. Yet, no scheme that achieves (1+ε)-approximation ratio is known. We give a distributed algorithm that finds a cut of size (1+ε)λ in O(D+n) time, which is optimal up to polylogarithmic factors.