On a discrete John-type theorem
Abstract
As a discrete counterpart to the classical John theorem on the approximation of (symmetric) n-dimensional convex bodies K by ellipsoids, Tao and Vu introduced so called generalized arithmetic progressions P(A,b)⊂ Zn in order to cover (many of) the lattice points inside a convex body by a simple geometric structure. Among others, they proved that there exists a generalized arithmetic progressions P(A,b) such that P(A,b)⊂ K Zn⊂ P(A,O(n)3n/2b). Here we show that this bound can be lowered to nO( n) and study some general properties of so called unimodular generalized arithmetic progressions.
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