A Maclaurin type inequality

Abstract

The classical Maclaurin inequality asserts that the elementary symmetric means sk(y) = 1nk Σ1 ≤ i1 < … < ik ≤ n yi1 … yik obey the inequality s(y)1/ ≤ sk(y)1/k whenever 1 ≤ k ≤ ≤ n and y = (y1,…,yn) consists of non-negative reals. We establish a variant |s(y)|1 1/2k1/2 (|sk(y)|1k, |sk+1(y)|1k+1) of this inequality in which the yi are permitted to be negative. In this regime the inequality is sharp up to constants. Such an inequality was previously known without the k1/2 factor in the denominator.

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