Improved bounds for a discrete John-type theorem

Abstract

Tao and Vu introduced a discrete analogue of John's theorem in which convex progressions are approximated by generalized arithmetic progressions. In the covering version of this problem, one asks for a small GAP containing all lattice points of a given origin-symmetric convex body. We prove that every such convex progression in dimension n admits an infinitely proper GAP cover whose size is within a factor O(n)2n of the cardinality of the original set, improving the previously known factor O(n)3n. We also show that a loss of order Ω(n)n is unavoidable for infinitely proper GAP covers.

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