English

Algebraic structures in comodule categories over weak bialgebras

Quantum Algebra 2022-10-04 v2 Rings and Algebras

Abstract

For a bialgebra LL coacting on a k\Bbbk-algebra AA, a classical result states that AA is a right LL-comodule algebra if and only if AA is an algebra in the monoidal category ML\mathcal{M}^{L} of right LL-comodules; the former notion is formulaic while the latter is categorical. We generalize this result to the setting of weak bialgebras HH. The category MH\mathcal{M}^H admits a monoidal structure by work of Nill and B\"{o}hm-Caenepeel-Janssen, but the algebras in MH\mathcal{M}^H are not canonically k\Bbbk-algebras. Nevertheless, we prove that there is an isomorphism between the category of right HH-comodule algebras and the category of algebras in MH\mathcal{M}^H. We also recall and introduce the formulaic notion of HH coacting on a k\Bbbk-coalgebra and on a Frobenius k\Bbbk-algebra, respectively, and prove analogous category isomorphism results. Our work is inspired by the physical applications of Frobenius algebras in tensor categories and by symmetries of algebras with a base algebra larger than the ground field (e.g. path algebras). We produce examples of the latter by constructing a monoidal functor from a certain corepresentation category of a bialgebra LL to the corepresentation category of a weak bialgebra built from LL (a "quantum transformation groupoid"), thereby creating weak quantum symmetries from ordinary quantum symmetries.

Keywords

Cite

@article{arxiv.1911.12847,
  title  = {Algebraic structures in comodule categories over weak bialgebras},
  author = {Chelsea Walton and Elizabeth Wicks and Robert Won},
  journal= {arXiv preprint arXiv:1911.12847},
  year   = {2022}
}

Comments

v2: 34 pages. Final version

R2 v1 2026-06-23T12:30:26.543Z