Star decompositions via orientations

Abstract

A k-star decomposition of a graph is a partition of its edges into k-stars (i.e., k edges with a common vertex). The paper studies the following problem: given k ≤ d/2, does the random d-regular graph have a k-star decomposition (asymptotically almost surely, provided that the number of edges is divisible by k)? Delcourt, Greenhill, Isaev, Lidick\'y, and Postle proved the a.a.s. existence for every odd k using earlier results regarding orientations satisfying certain degree conditions modulo k. In this paper we give a direct, self-contained proof that works for every d and every k<d/2-1. In fact, we prove stronger results. Let s≥ 1 denote the integer part of d/(2k). We show that the random d-regular graph a.a.s. has a k-star decomposition such that the number of stars centered at each vertex is either s or s+1. Moreover, if k < d/3 or k ≤ d/2 - 2.6 d, we can even prescribe the set of vertices with s stars, as long as it is of the appropriate size.