Infinite unrestricted sumsets in subsets of abelian groups with large density
Abstract
Let (G,+) be a countable abelian group such that the subgroup \g+g g∈ G\ has finite index and the doubling map g g+g has finite kernel. We establish lower bounds on the upper density of a set A⊂ G with respect to an appropriate Flner sequence, so that A contains a sumset of the form \t+b1+b2 b1,b2∈ B\ or \b1+b2 b1,b2∈ B\, for some infinite B⊂ G and some t∈ G. Both assumptions on G are necessary for our results to be true. We also characterize the Flner sequences for which this is possible. Finally, we show that our lower bounds are optimal in a strong sense.
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