English

Incompressible tensor categories

Category Theory 2023-06-19 v1 Representation Theory

Abstract

A symmetric tensor category D\mathcal D over an algebraically closed field kk is incompressible if every tensor functor out of D\mathcal D is an embedding. E.g., the categories VecVec and sVecsVec of (super)vector spaces are incompressible. Moreover, by Deligne's theorem, if char(k)=0(k)=0 then any tensor category of moderate growth uniquely fibres over sVecsVec, so VecVec and sVecsVec are the only incompressible categories in this class. Similarly, in characteristic p>0p>0, we have the incompressible Verlinde category VerpVer_p, and any Frobenius exact category of moderate growth uniquely fibres over VerpVer_p. More generally, the Verlinde categories VerpnVer_{p^n}, Verpn+Ver_{p^n}^+ are incompressible, and a key conjecture is that every tensor category of moderate growth uniquely fibres over VerpVer_{p^\infty}. 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 D\mathcal D 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 D\mathcal D is closed under quotients. Clearly, a subterminal Bezrukavnikov category is incompressible, and we conjecture the converse. We prove that VerpVer_p is Bezrukavnikov, generalizing the result of Bezrukavnikov for VecVec. We also find intrinsic sufficient conditions for incompressibility and subterminality. Namely, D\mathcal D 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 Ver2nVer_{2^n}.

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}
}
R2 v1 2026-06-28T11:07:03.556Z