New results related to a conjecture of Manickam and Singhi

Abstract

In 1998 Manickam and Singhi conjectured that for every positive integer d and every n 4d, every set of n real numbers whose sum is nonnegative contains at least n-1d-1 subsets of size d whose sums are nonnegative. In this paper we establish new results related to this conjecture. We also prove that the conjecture of Manickam and Singhi does not hold for n=2d+2.

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