Difference between revisions of "Maclaurin's Inequality"
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Revision as of 07:31, 15 October 2007
Maclaurin's Inequality is an inequality in symmetric polynomials. For notation and background, we refer to Newton's Inequality.
Statement
For non-negative ,
,
with equality exactly when all the are equal.
Proof
By the lemma from Newton's Inequality, it suffices to show that for any ,
.
Since this is a homogenous inequality, we may normalize so that . We then transform the inequality to
.
Since the geometric mean of is 1, the inequality is true by AM-GM.