Ribbons from Independence Structure: Hypercontractivity, $\Phi$-Mutual Information, and Matrix $\Phi$-Entropy
Abstract
We study the hypercontractivity ribbon and the -ribbon for joint distributions that obey a given independence structure, obtaining tight bounds in some basic regimes. For general independence structures, modeled as a hypergraph whose hyperedges specify mutually independent subcollections of random variables, we provide an explicit inner bound on the -ribbon described by a simple convex hull of incidence vectors. We also provide a new multipartite generalization version and a -mutual information analogue of the Zhang--Yeung inequality, which implies nontrivial points in the hypercontractivity ribbon and the -ribbon respectively. Finally, we propose the matrix -ribbon based on matrix -entropy and establish the tensorization and data processing properties, together with the calculation of an exact matrix SDPI constant for the doubly symmetric binary source.
Keywords
Cite
@article{arxiv.2601.18516,
title = {Ribbons from Independence Structure: Hypercontractivity, $\Phi$-Mutual Information, and Matrix $\Phi$-Entropy},
author = {Chenyu Wang and Amin Gohari},
journal= {arXiv preprint arXiv:2601.18516},
year = {2026}
}
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17 pages