Bounds on the density of smooth lattice coverings

Abstract

Let K be a convex body in Rn, let L be a lattice with covolume one, and let η>0. We say that K and L form an η-smooth cover if each point x ∈ Rn is covered by (1 η) vol(K) translates of K by L. We prove that for any positive σ, η, asymptotically as n ∞, for any K of volume n3+σ, one can find a lattice L for which L, K form an η-smooth cover. Moreover, this property is satisfied with high probability for a lattice chosen randomly, according to the Haar-Siegel measure on the space of lattices. Similar results hold for random construction A lattices, albeit with a worse power law, provided the ratio between the covering and packing radii of Zn with respect to K is at most polynomial in n. Our proofs rely on a recent breakthrough by Dhar and Dvir on the discrete Kakeya problem.

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