On subset sums of Zn× which are equally distributed modulo n
Abstract
In this note, we provide some results concerning the structure of a set A⊂eq Zn×, which has non-empty subset sums equally distributed modulo n. Here, Zn× denotes the set which contains all the invertible elements of the ring Zn. In particular, we prove that if n=q is a power of an odd prime, then A is a union of sets of the form \ a·(2i)\. Additionally, we count the number of subsets of Zq× with non-empty subset sums equally distributed modulo q.
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