Khovanskii's theorem and effective results on sumset structure

Abstract

A remarkable theorem due to Khovanskii asserts that for any finite subset A of an abelian group, the cardinality of the h-fold sumset hA grows like a polynomial for all sufficiently large h. Currently, neither the polynomial nor what sufficiently large means are understood. In this paper we obtain an effective version of Khovanskii's theorem for any A ⊂ Zd whose convex hull is a simplex; previously, such results were only available for d=1. Our approach gives information about not just the cardinality of hA, but also its structure, and we prove two effective theorems describing hA as a set: one answering a recent question posed by Granville and Shakan, the other a Brion-type formula that provides a compact description of hA for all large h. As a further illustration of our approach, we derive a completely explicit formula for |hA| whenever A ⊂ Zd consists of d+2 points.