On the minimum size of subset and subsequence sums in integers

Abstract

Let A be a sequence of rk terms which is made up of k distinct integers each appearing exactly r times in A. The sum of all terms of a subsequence of A is called a subsequence sum of A. For a nonnegative integer α ≤ rk, let α (A) be the set of all subsequence sums of A that correspond to the subsequences of length α or more. When r=1, we call the subsequence sums as subset sums and we write α (A) for α (A). In this article, using some simple combinatorial arguments, we establish optimal lower bounds for the size of α (A) and α (A). As special cases, we also obtain some already known results in this study.