A survey of some norm inequalities

Abstract

We survey some classical norm inequalities of Hardy, Kallman, Kato, Kolmogorov, Landau, Littlewood, and Rota of the type \[ \|A f\|X2 ≤ C \|f\|X \|A2 f\|X, f ∈ dom(A2), \] and recall that under exceedingly stronger hypotheses on the operator A and/or the Banach space X, the optimal constant C in these inequalities diminishes from 4 (e.g., when A is the generator of a C0 contraction semigroup on a Banach space X) all the way down to 1 (e.g., when A is a symmetric operator on a Hilbert space H). We also survey some results in connection with an extension of the Hardy-Littlewood inequality involving quadratic forms as initiated by Everitt.

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