Determining decomposition thresholds for long odd cycles

Abstract

An -cycle decomposition of a graph G is a set of -cycles in G whose edge sets partition the edge set of G. The -cycle decomposition threshold δC is then the least real number such that any n-vertex graph G with minimum degree at least (δC+o(1))n has an -cycle decomposition if and only if divides |E(G)| and each vertex of G has even degree. Nash-Williams' famous conjecture on triangle decompositions states, asymptotically, that δC3=34. A very recent breakthrough result of Delcourt and Postle completely resolved this conjecture, however, Glock, Kühn, and Osthus have posed the problem of determining δC for larger odd values of (the behaviour of δC for even is different and well understood). A natural generalisation of Nash-Williams' conjecture implies that δC=2-2 for all odd ≥ 3. Here we prove that this conjecture holds for all ≥ 73.