Double-Star Decomposition of Regular Graphs
Abstract
A tree containing exactly two non-pendant vertices is called a double-star. A double-star with degree sequence (k1+ 1, k2+ 1, 1, …, 1) is denoted by Sk1, k2. We study the edge-decomposition of regular graphs into double-stars. It was proved that every double-star of size k decomposes every 2k-regular graph. In this paper, we extend this result to (2k+ 1)-regular graphs, by showing that every (2k+ 1)-regular graph containing two disjoint perfect matchings is decomposed into Sk1, k2 and Sk1-1, k2, for all positive integers k1 and k2 such that k1 + k2= k.
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