Cycle lengths in the percolated hypercube
Abstract
Let Qdp be the random subgraph of the d-dimensional binary hypercube obtained after edge-percolation with probability p. It was shown recently by the authors that, for every > 0, there is some c = c()>0 such that, if pd c, then typically Qdp contains a cycle of length at least (1-)2d. We strengthen this result to show that, under the same assumptions, typically Qdp contains cycles of all even lengths between 4 and (1-)2d.
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