A note on the non-commutative arithmetic-geometric mean inequality
Abstract
This note proves the following inequality: if n=3k for some positive integer k, then for any n positive definite matrices A1,A2,·s,An, equation 1n3\|Σj1,j2,j3=1nAj1Aj2Aj3\| ≥ (n-3)!n! \|Σj1,j2,j3=1,\1, j2, j3 all distinctnAj1Aj2Aj3\|, equation where \|·\| represents the operator norm. This inequality is a special case of a recent conjecture by Recht and R\'e.
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