An Optimal Stability Theorem for Hölder's Inequality
Abstract
We prove an optimal L1 stability theorem for Hölder's inequality. Let p>1, q>1, and 1/p+1/q=1. If ak,bk 0 and \[ Σk=1n ak=Σk=1n bk=1, \] then \[ 1-Σk=1n ak1/pbk1/q 12pq(Σk=1n |ak-bk|)2 . \] The constant 1/(2pq) is best possible. We also give the corresponding integral form.
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