Renling Jin proved that if A and B are two subsets of the natural numbers with positive Banach density, then A+B is piecewise syndetic. In this paper, we prove that, under various assumptions on positive lower or upper densities of A and B, there is a high density set of witnesses to the piecewise syndeticity of A+B. Most of the results are shown to hold more generally for subsets of Z^d. The key technical tool is a Lebesgue density theorem for measure spaces induced by cuts in the nonstandard integers.

High density piecewise syndeticity of sumsets

DI NASSO, MAURO;
2015-01-01

Abstract

Renling Jin proved that if A and B are two subsets of the natural numbers with positive Banach density, then A+B is piecewise syndetic. In this paper, we prove that, under various assumptions on positive lower or upper densities of A and B, there is a high density set of witnesses to the piecewise syndeticity of A+B. Most of the results are shown to hold more generally for subsets of Z^d. The key technical tool is a Lebesgue density theorem for measure spaces induced by cuts in the nonstandard integers.
2015
DI NASSO, Mauro; Goldbring, Isaac; Jin, Renling; Leth, Steven; Lupini, Martino; Mahlburg, Karl
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Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/11568/774901
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