BRAIDED GROUPS

被引：140

作者：

MAJID, S

机构：

[1] Department of Applied Mathematics and Theoretical Physics, University of Cambridge, Cambridge

来源：

JOURNAL OF PURE AND APPLIED ALGEBRA | 1993年 / 86卷 / 02期

关键词：

D O I：

10.1016/0022-4049(93)90103-Z

中图分类号：

O29 [应用数学];

学科分类号：

070104 ;

摘要：

We prove a highly generalized Tannaka-Krein type reconstruction theorem for a monoidal category C functored by F : C --> V to a suitably cocomplete rigid quasitensor category V. The generalized theorem associates to this a bialgebra or Hopf algebra Aut(C, F, V) in the category V. As a corollary, to every cocompleted rigid quasitensor category C is associated Aut(C) Aut(C, id, CBAR). It is braided-commutative in a certain sense and hence analogous to the ring of 'co-ordinate functions' on a group or supergroup, i.e., a 'braided group'. We derive the formulae for the transmutation of an ordinary dual quasitriangular Hopf algebra into such a braided group. More generally, we obtain a Hopf algebra B(A1, f, A2) (in a braided category) associated to an ordinary Hopf algebra map f : A1 --> A2 between ordinary dual quasitriangular Hopf algebras A1, A2.

引用

页码：187 / 221

页数：35

共 32 条

[1]

CONNES A, 1986, IHES62 TECHN REP

[2]

DAY B, 1969, LECTURE NOTES MATH, V137

[3]

Deligne P., 1982, LECT NOTES MATH, V900

[4]

DRINFELD VG, 1987, 1986 P INT C MATH BE, P798

[5] BRAIDED COMPACT CLOSED CATEGORIES WITH APPLICATIONS TO LOW DIMENSIONAL TOPOLOGY [J].

FREYD, PJ ;

YETTER, DN .

ADVANCES IN MATHEMATICS, 1989, 77 (02) :156-182

[6]

GROTHENDIEK A, 1972, LECTURE NOTES MATH, V269

[7]

GUREVICH D, 1986, STOCKHOLM MATH REP, V24, P33

[8] THE GEOMETRY OF TENSOR CALCULUS .1. [J].

JOYAL, A ;

STREET, R .

ADVANCES IN MATHEMATICS, 1991, 88 (01) :55-112

[9]

JOYAL A, 1986, 86008 MACQ U MATH RE

[10]

LYUBASHENKO V, 1991, TANGLES HOPF ALGEBRA

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