The Lights Out Game on Directed Graphs

Abstract

We study a version of the lights out game played on directed graphs. For a digraph D, we begin with a labeling of V(D) with elements of Zk for k 2. When a vertex v is toggled, the labels of v and any vertex that v dominates are increased by 1 mod k. The game is won when each vertex has label 0. We say that D is k-Always Winnable (also written k-AW) if the game can be won for every initial labeling with elements of Zk. We prove that all acyclic digraphs are k-AW for all k, and we reduce the problem of determining whether a graph is k-AW to the case of strongly connected digraphs. We then determine winnability for tournaments with a minimum feedback arc set that arc-induces a directed path or directed star digraph.