Maximizing the number of nonnegative subsets
Abstract
Given a set of n real numbers, if the sum of elements of every subset of size larger than k is negative, what is the maximum number of subsets of nonnegative sum? In this note we show that the answer is n-1k-1 + n-1k-2 + ·s + n-10+1, settling a problem of Tsukerman. We provide two proofs, the first establishes and applies a weighted version of Hall's Theorem and the second is based on an extension of the nonuniform Erdos-Ko-Rado Theorem.
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