Note on packing of edge-disjoint spanning trees in sparse random graphs

Abstract

The spanning tree packing number of a graph G is the maximum number of edge-disjoint spanning trees contained in G. Let k≥ 1 be a fixed integer. Palmer and Spencer proved that in almost every random graph process, the hitting time for having k edge-disjoint spanning trees equals the hitting time for having minimum degree k. In this paper, we prove that for any p such that ( n+ω(1))/n≤ p≤ (1.1 n)/n, almost surely the random graph G(n,p) satisfies that the spanning tree packing number is equal to the minimum degree. Note that this bound for p will allow the minimum degree to be a function of n, and in this sense we improve the result of Palmer and Spencer. Moreover, we also obtain that for any p such that p≥ (51 n)/n, almost surely the random graph G(n,p) satisfies that the spanning tree packing number is less than the minimum degree.