List packing of graphs with bounded tree-width
Abstract
Assume L is a k-assignment of a graph G. An L-packing φ of G is a sequence φ=(φ1, …, φk) of k-mappings such that each φi is an L-coloring of G, and for each vertex v of G, \φ1(v), …, φk(v)\ = L(v) (and hence φi(v) φj(v) when i j). We say G is list k-packable if for any k-assignment L of G, there is an L-packing of G. The list packing number l(G) of G is the minimum integer k such that G is k-packable. For a positive integer d, let t(d) be the maximum packing number of graphs of tree-width at most d. It was known that d+1 t(d) 2d for any d. In this paper, we prove that t(d) 2d-1 for d 3, and t(d) d+2 for d 2. In particular, t(2)=4 and t(3)=5. Furthermore, we show that for constant positive integers k, d, the problem of determining l(G)≤ k or not for a graph G of tree-width at most d is solvable in linear time.
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