Functions tiling simultaneously with two arithmetic progressions
Abstract
We consider measurable functions f on R that tile simultaneously by two arithmetic progressions α Z and β Z at respective tiling levels p and q. We are interested in two main questions: what are the possible values of the tiling levels p,q, and what is the least possible measure of the support of f? We obtain sharp results which show that the answers depend on arithmetic properties of α, β and p,q, and in particular, on whether the numbers α, β are rationally independent or not.
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