Asymptotically tight bounds on subset sums

Abstract

For a subset A of a finite abelian group G we define Sigma(A)=suma∈ Ba:B⊂ A. In the case that Sigma(A) has trivial stabiliser, one may deduce that the size of Sigma(A) is at least quadratic in |A|; the bound |Sigma(A)|>= |A|2/64 has recently been obtained by De Vos, Goddyn, Mohar and Samal. We improve this bound to the asymptotically best possible result |Sigma(A)|>= (1/4-o(1))|A|2. We also study a related problem in which A is any subset of Zn with all elements of A coprime to n; it has recently been shown, by Vu, that if such a set A has the property Sigma(A) is not Zn then |A|=O(sqrtn). This bound was improved to |A|<= 8sqrtn by De Vos, Goddyn, Mohar and Samal, we further improve the bound to the asymptotically best possible result |A|<= (2+o(1))sqrtn.