Decomposing random regular graphs into stars

Abstract

We study k-star decompositions, that is, partitions of the edge set into disjoint stars with k edges, in the uniformly random d-regular graph model Gn,d. Using the small subgraph conditioning method, we prove an existence result for such decompositions for all d,k such that d/2 < k ≤ d/2 + \1,16 d\. More generally, we give a sufficient existence condition that can be checked numerically for any given values of d and k. Complementary negative results are obtained using the independence ratio of random regular graphs. Our results establish an existence threshold for k-star decompositions in Gn,d for all d≤ 100 and k > d/2. For smaller values of k, the connection between k-star decompositions and β-orientations allows us to apply results of Thomassen (2012) and Lov\'asz, Thomassen, Wu and Zhang (2013). We prove that random d-regular graphs satisfy their assumptions with high probability, thus establishing a.a.s. existence of k-star decompositions (i) when 2k2+k≤ d, and (ii) when k is odd and k < d/2.