The list-coloring function of signed graphs
Abstract
It is known that, for any k-list assignment L of a graph G, the number of L-list colorings of G is at least the number of the proper k-colorings of G when k>(m-1)/(1+2). In this paper, we extend the Whitney's broken cycle theorem to L-colorings of signed graphs, by which we show that if k> m3+m4+m-1 then, for any k-assignment L, the number of L-colorings of a signed graph with m edges is at least the number of the proper k-colorings of . Further, if L is 0-free (resp., 0-included) and k is even (resp., odd), then the lower bound m3+m4+m-1 for k can be improved to (m-1)/(1+2).
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