Annealed almost periodic entropy
Abstract
This work studies certain notions of entropy that can be associated to (i) a representation of a separable, unital C*-algebra and (ii) an auxiliary random sequence of finite-dimensional representations of . This continues a previous research program into the properties of these entropy notions when each is deterministic, which uncovered a range of analogies with entropy in ergodic theory and also with non-commutative generalizations of Szeg\H{o}'s limit theorems. We associate two new notions of entropy to data as in (i) and (ii) above: `annealed' AP entropy, which is roughly a kind of first-moment average of deterministic AP entropies; and `zeroth-order' AP entropy, which controls the large deviations probabilities that certain positive definite functions appear in the representations at all. After developing some of this general theory, we then focus on the special case in which is the group C*-algebra of a finitely-generated free group and each is generated by choosing a tuple of -by- unitary matrices independently at random from Haar measure. In that case, explicit formulas can be derived for some of our notions of entropy, and new large deviations principles in random matrix theory are obtained as a consequence.
Cite
@article{arxiv.2507.08909,
title = {Annealed almost periodic entropy},
author = {Tim Austin},
journal= {arXiv preprint arXiv:2507.08909},
year = {2026}
}
Comments
138p. [v1:] An updated version of Part II of v1. of arXiv:2412.13751, which is now separate from Part I. [v2:] Major changes: (1) completely new proof of Theorem C (`temperedness theorem'), and (2) substantial editing and re-organization throughout. As a result the new version is much shorter than v1