Random Cayley graphs and random sumsets
Abstract
We prove that any finite abelian group G contains a collection of not too many subsets with a special structure, so that for every subset A of G with a small doubling, there is a member F of the collection that is fully contained in the sumset A+A and is not much smaller than it. Using this result we obtain improved bounds for the problem of estimating the typical independence number of sparse random Cayley or Cayley-sum graphs, and for the problem of estimating the smallest size of a subset of G which is not a sumset. We also obtain tight bounds for the typical maximum length of an arithmetic progression in the sumset of a sparse random subset of G.
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