Circuit Complexity of Bounded Planar Cutwidth Graph Matching

Abstract

Recently, perfect matching in bounded planar cutwidth bipartite graphs () was shown to be in ACC0 by Hansen et al.. They also conjectured that the problem is in AC0. In this paper, we disprove their conjecture by showing that the problem is not in AC0[pα] for every prime p. Our results show that the previous upper bound is almost tight. Our techniques involve giving a reduction from Parity to BGGM. A further improvement in lower bounds is difficult since we do not have an algebraic characterization for AC0[m] where m is not a prime power. Moreover, this will also imply a separation of AC0[m] from P. Our results also imply a better lower bound for perfect matching in general bounded planar cutwidth graphs.