On the minimum degree required for a triangle decomposition

Abstract

We prove that, for sufficiently large n, every graph of order n with minimum degree at least 0.852n has a fractional edge-decomposition into triangles. We do this by refining a method used by Dross to establish a bound of 0.9n. By a result of Barber, K\"uhn, Lo and Osthus, our result implies that, for each ε >0, every graph of sufficiently large order n with minimum degree at least (0.852+ε)n has a triangle decomposition if and only if it has all even degrees and number of edges a multiple of three.