Strong fractional choice number of series-parallel graphs
Abstract
The strong fractional choice number of a graph G is the infimum of those real numbers r such that G is ( rm , m)-choosable for every positive integer m. The strong fractional choice number of a family G of graphs is the supremum of the strong fractional choice number of graphs in G. We denote by Qk the class of series-parallel graphs with girth at least k. This paper proves that for k=4q-1, 4q,4q+1, 4q+2, the strong fractional number of Qk is exactly 2+ 1q.
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