Fractional cycle decompositions in hypergraphs

Abstract

We prove that for any integer k≥ 2 and >0, there is an integer 0≥ 1 such that any k-uniform hypergraph on n vertices with minimum codegree at least (1/2+)n has a fractional decomposition into tight cycles of length (-cycles for short) whenever ≥ 0 and n is large in terms of . This is essentially tight. This immediately yields also approximate integral decompositions for these hypergraphs into -cycles. Moreover, for graphs this even guarantees integral decompositions into -cycles and solves a problem posed by Glock, K\"uhn and Osthus. For our proof, we introduce a new method for finding a set of -cycles such that every edge is contained in roughly the same number of -cycles from this set by exploiting that certain Markov chains are rapidly mixing.

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