Generalized (anti) Yetter-Drinfeld modules as components of a braided T-category
arXiv:math/0503413
Abstract
If H is a Hopf algebra with bijective antipode and α, β\in Aut_{Hopf}(H), we introduce a category_H{\cal YD}^H(α, β), generalizing both Yetter-Drinfeld and anti-Yetter-Drinfeld modules. We construct a braided T-category {\cal YD}(H) having all these categories as components, which if H is finite dimensional coincides with the representations of a certain quasitriangular T-coalgebra DT(H) that we construct. We also prove that if (α, β) admits a so-called pair in involution, then_H{\cal YD}^H(α, β) is isomorphic to the category of usual Yetter-Drinfeld modules_H{\cal YD}^H.
12 pages, Latex, no figures