Reflective centers of module categories and quantum K-matrices

Abstract

Our work is motivated by obtaining solutions to the quantum reflection equation (qRE) by categorical methods. To start, given a braided monoidal category C and C-module category M, we introduce a version of the Drinfeld center Z(C) of C adapted for M; we refer to this category as the "reflective center" EC(M) of M. Just like Z(C) is a canonical braided monoidal category attached to C, we show that EC(M) is a canonical braided module category attached to M; its properties are investigated in detail. Our second goal pertains to when C is the category of modules over a quasitriangular Hopf algebra H, and M is the category of modules over an H-comodule algebra A. We show that the reflective center EC(M) here is equivalent to a category of modules over an explicit algebra, denoted by RH(A), which we call the "reflective algebra" of A. This result is akin to Z(C) being represented by the Drinfeld double Drin(H) of H. We also study the properties of reflective algebras. Our third set of results is also in the Hopf setting above. We show that reflective algebras are quasitriangular H-comodule algebras, and examine their corresponding quantum K-matrices; this yields solutions to the qRE. We also establish that the reflective algebra RH() is an initial object in the category of quasitriangular H-comodule algebras, where is the ground field. The case when H is the Drinfeld double of a finite group is illustrated.