An improved bound for the Manickam-Mikl\'os-Singhi conjecture
Abstract
We show that for n>k(4e k)k every set \x1,..., xn\ of n real numbers with Σi=0nxi ≥ 0 has at least n-1k-1 k-element subsets of a non-negative sum. This is a substantial improvement on the best previously known bound of n>(k-1)(kk+k2)+k, proved by Manickam and Mikl\'os MM in 1987.
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