Incompressible tensor categories
Abstract
A symmetric tensor category over an algebraically closed field is incompressible if every tensor functor out of is an embedding. E.g., the categories and of (super)vector spaces are incompressible. Moreover, by Deligne's theorem, if char then any tensor category of moderate growth uniquely fibres over , so and are the only incompressible categories in this class. Similarly, in characteristic , we have the incompressible Verlinde category , and any Frobenius exact category of moderate growth uniquely fibres over . More generally, the Verlinde categories , are incompressible, and a key conjecture is that every tensor category of moderate growth uniquely fibres over . This would make the above the only incompressible categories in this class. We prove a part of this conjecture, showing that every tensor category of moderate growth fibres over an incompressible one. So it remains to understand incompressible categories. We say that is subterminal if it every tensor category admits at most one fibre functor to it, and a Bezrukavnikov category if the class of tensor categories that fibre over is closed under quotients. Clearly, a subterminal Bezrukavnikov category is incompressible, and we conjecture the converse. We prove that is Bezrukavnikov, generalizing the result of Bezrukavnikov for . We also find intrinsic sufficient conditions for incompressibility and subterminality. Namely, is maximally nilpotent if the growth rates of symmetric powers are minimal. We show that a finite maximally nilpotent category is incompressible, and also subterminal if it satisfies an additional geometric reductivity condition. Then we verify these conditions for .
Keywords
Cite
@article{arxiv.2306.09745,
title = {Incompressible tensor categories},
author = {Kevin Coulembier and Pavel Etingof and Victor Ostrik},
journal= {arXiv preprint arXiv:2306.09745},
year = {2023}
}