Deformations of mixed associators in module categories

Abstract

We set up a cochain complex Cmix(M) whose cohomology controls deformations of the mixed associator of a module category M over a -linear monoidal category C. We show that Cmix(M) is isomorphic to the Davydov-Yetter (DY) complex of the representation functor : C End(M). Using our previous results on DY cohomology (arXiv:2411.19111), we prove that if C and M are finite then the cohomology Hmix(M) is isomorphic to the relative Ext groups ExtZ(C),C(1,AM) for the usual adjunction between the Drinfeld center Z(C) and C, where AM is the so-called adjoint algebra of M. This allows us to give a dimension formula for Hnmix(M) in terms of certain Hom spaces in Z(C), and also to prove that H>0mix(C) = 0. We also show that the algebra AM is the ``full center'' of an algebra in C realizing M. We furthermore establish a generalized version of Ocneanu rigidity for monoidal functors with coefficients, and provide its application to general (non-exact and non-finite) C-module categories over a fusion category C such that (C) ≠ 0. We spell out these results for module categories defined by finite-dimensional comodule algebras over finite-dimensional Hopf algebras. Examples based on comodule algebras over Sweedler's Hopf algebra are worked out in detail and yield new continuous families of inequivalent non-exact module categories.