A Weighted Generalization of Two Theorems of Gao

Abstract

Let G be a finite abelian group and let A⊂eq Z be nonempty. Let DA(G) denote the minimal integer such that any sequence over G of length DA(G) must contain a nontrivial subsequence s1... sr such that Σi=1rwisi=0 for some wi∈ A. Let EA(G) denote the minimal integer such that any sequence over G of length EA(G) must contain a subsequence of length |G|, s1... s|G|, such that Σi=1|G|wisi=0 for some wi∈ A. In this paper, we show that EA(G)=|G|+DA(G)-1, confirming a conjecture of Thangadurai and the expectations of Adhikari, et al. The case A=\1\ is an older result of Gao, and our result extends much partial work done by Adhikari, Rath, Chen, David, Urroz, Xia, Yuan, Zeng and Thangadurai. Moreover, under a suitable multiplicity restriction, we show that not only can zero be represented in this manner, but an entire nontrivial subgroup, and if this subgroup is not the full group G, we obtain structural information for the sequence generalizing another non-weighted result of Gao. Our full theorem is valid for more general n-sums with n≥ |G|, in addition to the case n=|G|.