On the decomposition threshold of a given graph

Abstract

We study the F-decomposition threshold δF for a given graph F. Here an F-decomposition of a graph G is a collection of edge-disjoint copies of F in G which together cover every edge of G. (Such an F-decomposition can only exist if G is F-divisible, i.e. if e(F) e(G) and each vertex degree of G can be expressed as a linear combination of the vertex degrees of F.) The F-decomposition threshold δF is the smallest value ensuring that an F-divisible graph G on n vertices with δ(G)(δF+o(1))n has an F-decomposition. Our main results imply the following for a given graph F, where δF is the fractional version of δF and :=(F): (i) δF \δF,1-1/(+1)\; (ii) if 5, then δF∈\δF,1-1/,1-1/(+1)\; (iii) we determine δF if F is bipartite. In particular, (i) implies that δKr=δKr. Our proof involves further developments of the recent `iterative' absorbing approach.