Packing tight Hamilton cycles in uniform hypergraphs
Abstract
We say that a k-uniform hypergraph C is a Hamilton cycle of type , for some 1 k, if there exists a cyclic ordering of the vertices of C such that every edge consists of k consecutive vertices and for every pair of consecutive edges Ei-1,Ei in C (in the natural ordering of the edges) we have |Ei-1 Ei|=. We define a class of (,p)-regular hypergraphs, that includes random hypergraphs, for which we can prove the existence of a decomposition of almost all edges into type Hamilton cycles, where <k/2.
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