Indicated list colouring game on graphs

Abstract

Given a graph G and a list assignment L for G, the indicated L-colouring game on G is played by two players: Ann and Ben. In each round, Ann chooses an uncoloured vertex v, and Ben colours v with a colour from L(v) that is not used by its coloured neighbours. If all vertices are coloured, then Ann wins the game. Otherwise after a finite number of rounds, there remains an uncoloured vertex v such that all colours in L(v) have been used by its coloured neighbours, Ben wins. We say G is indicated L-colourable if Ann has a winning strategy for the indicated L-colouring game on G. For a mapping g: V(G) N, we say G is indicated g-choosable if G is indicated L-colourable for every list assignment L with |L(v)| g(v) for each vertex v, and G is indicated degree-choosable if G is indicated g-choosable for g(v) =dG(v) (the degree of v). This paper proves that a graph G is not indicated degree-choosable if and only if G is an expanded Gallai-tree - a graph whose maximal connected induced subgraphs with no clique-cut are complete graphs or blow-ups of odd cycles, along with a technical condition (see Definition def-egt). This leads to a linear-time algorithm that determines if a graph is indicated degree-choosable. A connected graph G is called an IC-Brooks graph if its indicated chromatic number equals (G)+1. Every IC-Brooks graph is a regular expanded Gallai-tree. We show that if r 3, then every r-regular expanded Gallai-tree is an IC-Brooks graph. For r 4, there are r-regular expanded Gallai-trees that are not IC-Brooks graphs. We give a characterization of IC-Brooks graphs, and present a linear-time algorithm that determines if a given graph of bounded maximum degree is an IC-Brooks graph.

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