Biclique coverings, rectifier networks and the cost of -removal

Abstract

We relate two complexity notions of bipartite graphs: the minimal weight biclique covering number Cov(G) and the minimal rectifier network size Rect(G) of a bipartite graph G. We show that there exist graphs with Cov(G)≥ Rect(G)3/2-ε. As a corollary, we establish that there exist nondeterministic finite automata (NFAs) with -transitions, having n transitions total such that the smallest equivalent -free NFA has (n3/2-ε) transitions. We also formulate a version of previous bounds for the weighted set cover problem and discuss its connections to giving upper bounds for the possible blow-up.