A SAT Attack on the Erdos Discrepancy Conjecture

Abstract

In 1930s Paul Erdos conjectured that for any positive integer C in any infinite +1 -1 sequence (xn) there exists a subsequence xd, x2d, ... , xkd for some positive integers k and d, such that |xd + x2d + ... + xkd|> C. The conjecture has been referred to as one of the major open problems in combinatorial number theory and discrepancy theory. For the particular case of C=1 a human proof of the conjecture exists; for C=2 a bespoke computer program had generated sequences of length 1124 having discrepancy 2, but the status of the conjecture remained open even for such a small bound. We show that by encoding the problem into Boolean satisfiability and applying the state of the art SAT solvers, one can obtain a sequence of length 1160 with discrepancy 2 and a proof of the Erdos discrepancy conjecture for C=2, claiming that no sequence of length 1161 and discrepancy 2 exists. We also present our partial results for the case of C=3.