Beyond Nash-Williams: Counterexamples to Clique Decomposition Thresholds for All Cliques Larger than Triangles

Abstract

A central open question in extremal design theory is Nash-Williams' Conjecture from 1970 that every K3-divisible graph on n vertices (for n large enough) with minimum degree at least 3n/4 has a K3-decomposition. A folklore generalization of Nash-Williams' Conjecture extends this to all q 4 by positing that every Kq-divisible graph on n vertices (for n large enough) with minimum degree at least (1-1q+1)n has a Kq-decomposition. We disprove this conjecture for all q 4; namely, we show that for each q 4, there exists c > 1 such that there exist infinitely many Kq-divisible graphs G with minimum degree at least (1-1c·(q+1))v(G) and no Kq-decomposition; indeed we construct them admitting no fractional Kq-decomposition thus disproving the fractional relaxation of this conjecture. Our result also disproves the more general partite version. Indeed, we even show the folklore conjecture is off by a multiplicative factor by showing that for every > 0 and every large enough integer q, there exist infinitely many Kq-divisible graphs G with minimum degree at least (1-1(1+22-)· (q+1))v(G) with no (fractional) Kq-decomposition.