New Deterministic Algorithms for Solving Parity Games

Abstract

We study parity games in which one of the two players controls only a small number k of nodes and the other player controls the n-k other nodes of the game. Our main result is a fixed-parameter algorithm that solves bipartite parity games in time kO(k)· O(n3), and general parity games in time (p+k)O(k) · O(pnm), where p is the number of distinct priorities and m is the number of edges. For all games with k = o(n) this improves the previously fastest algorithm by Jurdzi\'nski, Paterson, and Zwick (SICOMP 2008). We also obtain novel kernelization results and an improved deterministic algorithm for graphs with small average degree.