Clarkson-McCarthy inequality on a locally compact group

Abstract

Let G be a locally compact group, μ its Haar measure, G its Pontryagin dual and the dual measure. For any Aθ∈ L1(G; Cp) L2(G; Cp), ( Cp is Schatten ideal), and 1<p2 we prove ∫ G\|∫GAθ(θ)\, dμ(θ)\|pq\, d() (∫G\|Aθ\|pp\, dμ(θ))q/p, where q=p/(p-1). This appears to be a generalization of some earlier obtained inequalities, including Clarkson-McCarthy inequalities (in the case G= Z2), and Hausdorff-Young inequality. Some corollaries are also given.

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