English

Module categories, internal bimodules and Tambara modules

Category Theory 2024-08-28 v2 Representation Theory

Abstract

We use the theory of Tambara modules to extend and generalize the reconstruction theorem for module categories over a rigid monoidal category to the non-rigid case. We show a biequivalence between the 22-category of cyclic module categories over a monoidal category C\mathscr{C} and the bicategory of algebra and bimodule objects in the category of Tambara modules on C\mathscr{C}. Using it, we prove that a cyclic module category can be reconstructed as the category of certain free module objects in the category of Tambara modules on C\mathscr{C}, and give a sufficient condition for its reconstructability as module objects in C\mathscr{C}. To that end, we extend the definition of the Cayley functor to the non-closed case, and show that Tambara modules give a proarrow equipment for C\mathscr{C}-module categories, in which C\mathscr{C}-module functors are characterized as 11-morphisms admitting a right adjoint. Finally, we show that the 22-category of all C\mathscr{C}-module categories embeds into the 22-category of categories enriched in Tambara modules on C\mathscr{C}, giving an ''action via enrichment'' result.

Keywords

Cite

@article{arxiv.2210.13443,
  title  = {Module categories, internal bimodules and Tambara modules},
  author = {Mateusz Stroiński},
  journal= {arXiv preprint arXiv:2210.13443},
  year   = {2024}
}

Comments

63 pages

R2 v1 2026-06-28T04:23:16.257Z