Algebraic structures in comodule categories over weak bialgebras

Abstract

For a bialgebra L coacting on a -algebra A, a classical result states that A is a right L-comodule algebra if and only if A is an algebra in the monoidal category ML of right L-comodules; the former notion is formulaic while the latter is categorical. We generalize this result to the setting of weak bialgebras H. The category MH admits a monoidal structure by work of Nill and B\"ohm-Caenepeel-Janssen, but the algebras in MH are not canonically -algebras. Nevertheless, we prove that there is an isomorphism between the category of right H-comodule algebras and the category of algebras in MH. We also recall and introduce the formulaic notion of H coacting on a -coalgebra and on a Frobenius -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 L to the corepresentation category of a weak bialgebra built from L (a "quantum transformation groupoid"), thereby creating weak quantum symmetries from ordinary quantum symmetries.