Lower bounds for sphere packing in arbitrary norms

Abstract: We show that in any $d$-dimensional real normed space, unit balls can be packed with density at least [\frac{(1-o(1))d\log d}{2^{d+1}},] improving a result of Schmidt from 1958 by a logarithmic factor and generalizing the recent result of Campos, Jenssen, Michelen, and Sahasrabudhe in the $\ell_2$ norm. Our main tools are the graph-theoretic result used in the $\ell_2$ construction and volume bounds from convex geometry due to Petty and Schmuckenschl\"ager.