Additive Bases in Abelian Groups

Abstract

Let G be a finite, non-trivial abelian group of exponent m, and suppose that B1, ..., Bk are generating subsets of G. We prove that if k>2m 2 |G|, then the multiset union B1... Bk forms an additive basis of G; that is, for every g∈ G there exist A1⊂ B1, ..., Ak⊂ Bk such that g=Σi=1kΣa∈ Ai a. This generalizes a result of Alon, Linial, and Meshulam on the additive bases conjecture. As another step towards proving the conjecture, in the case where B1, ..., Bk are finite subsets of a vector space we obtain lower-bound estimates for the number of distinct values, attained by the sums of the form Σi=1k Σa∈ Ai a, where Ai vary over all subsets of Bi for each i=1, >..., k. Finally, we establish a surprising relation between the additive bases conjecture and the problem of covering the vertices of a unit cube by translates of a lattice, and present a reformulation of (the strong form of) the conjecture in terms of coverings.