Clique Decompositions in Random Graphs via Refined Absorption

Abstract

We prove that if p n-13+β for some β > 0, then asymptotically almost surely the binomial random graph G(n,p) has a K3-packing containing all but at most n + O(1) edges. Similarly, we prove that if d n23+β for some β > 0 and d is even, then asymptotically almost surely the random d-regular graph Gn,d has a triangle decomposition provided 3 d · n. We also show that G(n,p) admits a fractional K3-decomposition for such a value of p. We prove analogous versions for a Kq-packing of G(n,p) with p n-1q+0.5+β and leave of (q-2)n+O(1) edges, for Kq-decompositions of Gn,d with (q-1)~|~d and d n1-1q+0.5+β provided q d· n, and for fractional Kq-decompositions.