Herzog-Schonheim conjecture, vanishing sums of roots of unity and convex polygons

Abstract

Let G be a group and H1,…,Hs be subgroups of G of indices d1,…,ds respectively. In 1974, M. Herzog and J. Sch\"onheim conjectured that if \Hiαi\i=1i=s, αi∈ G, is a coset partition of G, then d1,…,ds cannot be distinct. In this paper, we present the conjecture as a problem on vanishing sum of roots of unity and convex polygons and prove some results using this approach.