Short Synchronizing Words for Random Automata

Abstract: We prove that a uniformly random automaton with n states on a 2-letter alphabet has a synchronizing word of length O(n 1/2 log n) with high probability (w.h.p.). That is to say, w.h.p. there exists a word ω of such length, and a state v0, such that ω sends all states to v0. Prior to this work, the best upper bound was the quasilinear bound O(n log 3 n) due to Nicaud [Nic19]. The correct scaling exponent had been subject to various estimates by other authors between 0.5 and 0.56 based on numerical simulations, … Show more