On lattice coverings by locally anti-blocking bodies and polytopes with few vertices

Abstract

In 2021, Ordentlich, Regev and Weiss made a breakthrough that the lattice covering density of any n-dimensional convex body is upper bounded by cn2, improving on the best previous bound established by Rogers in 1959. However, for the Euclidean ball, Rogers obtained the better upper bound n(en)c, and this result was extended to certain symmetric convex bodies by Gritzmann. The constant c above is independent on n. In this paper, we show that such a bound can be achieved for more general classes of convex bodies without symmetry, including anti-blocking bodies, locally anti-blocking bodies and n-dimensional polytopes with n+2 vertices.