Equal-Subset-Sum Faster Than the Meet-in-the-Middle

Abstract

In the Equal-Subset-Sum problem, we are given a set S of n integers and the problem is to decide if there exist two disjoint nonempty subsets A,B ⊂eq S, whose elements sum up to the same value. The problem is NP-complete. The state-of-the-art algorithm runs in O*(3n/2) O*(1.7321n) time and is based on the meet-in-the-middle technique. In this paper, we improve upon this algorithm and give O*(1.7088n) worst case Monte Carlo algorithm. This answers the open problem from Woeginger's inspirational survey. Additionally, we analyse the polynomial space algorithm for Equal-Subset-Sum. A naive polynomial space algorithm for Equal-Subset-Sum runs in O*(3n) time. With read-only access to the exponentially many random bits, we show a randomized algorithm running in O*(2.6817n) time and polynomial space.