Variants of the Erdos distinct sums problem and variance method

Abstract

Let =\a1, … , an\ be a set of positive integers with a1 < … < an such that all 2n subset sums are pairwise distinct. A famous conjecture of Erdos states that an>C· 2n for some constant C, while the best result known to date is of the form an>C· 2n/n. In this paper, we propose a generalization of the Erdos distinct sum problem that is in the same spirit as those of the Davenport and the Erdos-Ginzburg-Ziv constants recently introduced in CGS and in CS. More precisely, we require that the non-zero evaluations of the m-th degree symmetric polynomial are all distinct over the subsequences of whose size is at most λ n, for a given λ∈ (0,1], considering as a sequence in Zk with each coordinate of each ai in [0,M]. If Fλ,n denotes the family of subsets of [1,n] whose size is at most λ n, our main result is that, for each k,m, and λ, there exists an explicit constant Ck,m,λ such that M≥ Ck,m,λ (1+o(1)) |Fλ,n|1mkn1 - 12m.