C*-like modules and matrix $p$-operator norms
Functional Analysis
2026-03-17 v2 Operator Algebras
Abstract
We present a generalization of H\"older duality to algebra-valued pairings via -modules. H\"older duality states that if and are conjugate exponents, then the dual space of is isometrically isomorphic to . In this work we study certain pairs , as generalizations of the pair , that have an -operator algebra valued pairing . When the -valued version of H\"older duality still holds, we say that is C*-like. We show that finite and countable direct sums of the C*-like module are still C*-like when is any block diagonal subalgebra of matrices. We provide counterexamples when is not block diagonal.
Cite
@article{arxiv.2505.19471,
title = {C*-like modules and matrix $p$-operator norms},
author = {Alessandra Calin and Ian Cartwright and Luke Coffman and Alonso Delfín and Charles Girard and Jack Goldrick and Anoushka Nerella and Wilson Wu},
journal= {arXiv preprint arXiv:2505.19471},
year = {2026}
}
Comments
AMSLaTeX; 19 pages. V2: Final version accepted in the Annals of Functional Analysis