C*-like modules and matrix p-operator norms

Abstract

We present a generalization of H\"older duality to algebra-valued pairings via Lp-modules. H\"older duality states that if p ∈ (1, ∞) and p are conjugate exponents, then the dual space of Lp(μ) is isometrically isomorphic to Lp(μ). In this work we study certain pairs (Y,X), as generalizations of the pair (Lp(μ), Lp(μ)), that have an Lp-operator algebra valued pairing Y × X A. When the A-valued version of H\"older duality still holds, we say that (Y,X) is C*-like. We show that finite and countable direct sums of the C*-like module (A,A) are still C*-like when A is any block diagonal subalgebra of d × d matrices. We provide counterexamples when A ⊂ Mdp(C) is not block diagonal.