Entropy as a Topological Operad Derivation
Abstract
We share a small connection between information theory, algebra, and topology - namely, a correspondence between Shannon entropy and derivations of the operad of topological simplices. We begin with a brief review of operads and their representations with topological simplices and the real line as the main example. We then give a general definition for a derivation of an operad in any category with values in an abelian bimodule over the operad. The main result is that Shannon entropy defines a derivation of the operad of topological simplices, and that for every derivation of this operad there exists a point at which it is given by a constant multiple of Shannon entropy. We show this is compatible with, and relies heavily on, a well-known characterization of entropy given by Faddeev in 1956 and a recent variation given by Leinster.
Cite
@article{arxiv.2107.09581,
title = {Entropy as a Topological Operad Derivation},
author = {Tai-Danae Bradley},
journal= {arXiv preprint arXiv:2107.09581},
year = {2021}
}
Comments
13 pages; v2. version appearing in Entropy (minor changes, typos fixed)