Doi-Hopf module

In quantum group, Hopf algebra and weak Hopf algebra, the Doi-Hopf module is a crucial construction that has many applications. It's named after Japanese mathematician Yukio Doi (土井 幸雄^[1]) and German mathematician Heinz Hopf. The concept was introduce by Doi in his 1992 paper "unifying Hopf modules^[2]".

Doi-Hopf module

A right Doi-Hopf datum is a triple ${\displaystyle (H,A,C)}$  with ${\displaystyle H}$  a Hopf algebra, ${\displaystyle A}$  a left ${\displaystyle H}$ -comodule algebra, and ${\displaystyle C}$  a right ${\displaystyle H}$ -module coalgebra. A left-right Doi-Hopf ${\displaystyle (H,A,C)}$ -module ${\displaystyle M}$  is a left ${\displaystyle A}$ -module and a right ${\displaystyle C}$ -comodule via ${\displaystyle \beta :M\to M\otimes C}$  such that ${\displaystyle \beta (am)=\sum a_{(0)}m_{[0]}\otimes a_{(1)}\rightharpoonup m_{[1]}}$  for all ${\displaystyle a\in A,m\in M}$ . The subscript is the Sweedler notation.

A left Doi-Hopf datum is a triple ${\displaystyle (H,A,C)}$  with ${\displaystyle H}$  a Hopf algebra, ${\displaystyle A}$  a right ${\displaystyle H}$ -comodule algebra, and ${\displaystyle C}$  a left ${\displaystyle H}$ -module coalgebra. A Doi-Hopf module can be defined similarly.

Doi-Hopf module in weak Hopf algebra

The generalization of Doi-Hopf module in weak Hopf algebra case is given by Gabriella Böhm in 2000.^[3]

References

1. "土井 幸雄 (Yukio Doi) - マイポータル - researchmap". researchmap.jp. Retrieved 2022-12-30.
2. Doi, Yukio (1992-12-15). "Unifying Hopf modules". Journal of Algebra. 153 (2): 373–385. doi:10.1016/0021-8693(92)90160-N. ISSN 0021-8693.
3. Böhm, Gabriella (2000-01-01). "Doi-hopf modules over weak hopf algebras". Communications in Algebra. 28 (10): 4687–4698. arXiv:math/9905027. doi:10.1080/00927870008827113. ISSN 0092-7872. S2CID 123012465.