On an Erdos similarity problem in the large
Abstract
In a recent paper, Kolountzakis and Papageorgiou ask if for every ε ∈ (0,1], there exists a set S ⊂eq R such that S I ≥ 1 - ε for every interval I ⊂ R with unit length, but that does not contain any affine copy of a given increasing sequence of exponential growth or faster. This question is an analogue of the well-known Erdos similarity problem. In this paper, we show that for each sequence of real numbers whose integer parts form a set of positive upper Banach density, one can explicitly construct such a set S that contains no affine copy of that sequence. Since there exist sequences of arbitrarily rapid growth that satisfy this condition, our result answers Kolountzakis and Papageorgiou's question in the affirmative. A key ingredient of our proof is a generalization of results by Amice, Kahane, and Haight from metric number theory. In addition, we construct a set S with the required property -- but with ε ∈ (1/2, 1] -- that contains no affine copy of \2n\.
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