QuasiYangBaxterEquation

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Yetter-Drinfel'd module

(Definition)

Definition 0.1 Let $H$

be a quasi-bialgebra with reassociator $\Phi$ . A left $H$

-module

together with a left $H$

-coaction $\lambda_M : M \to H \otimes M$ , $\lambda_M (m) = \sum m_{(\widehat{a} H R1)} \otimes m_0$ is called a left Yetter-Drinfeld module if the following equalities hold, for all $h \in H$ and $m \in M$ :

$\displaystyle \sum X^1 m_{(\widehat{a} H R1)} \otimes (X^2 . m_{(0)})_{(\wideha... ...\times (Y^1 x m)_{(\widehat{a}H R1)2} \times Y^3 \otimes X^3 x (Y^1 x m)_{(0)},$

and $\sum \epsilon(m_{(\widehat{a} H R1)})m_0 = m ,$ and

$\displaystyle \sum h_1 m_{(\widehat{a}H R1)} \otimes h_2 \times m_0 = \sum (h_1 . m)_{(\widehat{a} H R1)} h_2 \otimes (h_1 . m)_0.$

Remark This module (ref.[1]) is essential for solving the quasi–Yang–Baxter equation which is an important relation in mathematical physics.

Drinfel'd modules

Let us consider a module that operates over a ring of functions on a curve over a finite field, which is called an elliptic module. Such modules were first studied by Vladimir Drinfel'd in 1973 and called accordingly Drinfel'd modules.

Bibliography

1: Bulacu, D, Caenepeel, S, Torrecillas, B, Doi-Hopf modules and Yetter-Drinfeld modules for quasi-Hopf algebras. Communications in Algebra, 34 (9), pp. 3413-3449, 2006.
2: D. Bulacu, S. Caenepeel, A and F. Panaite. 2003. More Properties of Yetter-Drinfeld modules over Quasi-Hopf Algebras., Preprint.

"Yetter-Drinfel'd module" is owned by bci1.

Other names:

Yetter module

Also defines:

Drinfel'd module, coaction, quasi-bialgebra, quasi-Hopf algebras, left $H$

-coaction, left Yetter-Drinfel'd module, elliptic module, quasi--Yang--Baxter equation

Keywords:

Drinfel'd module, coaction, quasi-Hopf algebras, quasi-bialgebra, left $H$

-coaction, left Yetter-Drinfel'd module, elliptic module, quasi--Yang--Baxter equation

Cross-references: field, functions, mathematical physics, relation, module

This is version 7 of Yetter-Drinfel'd module, born on 2009-04-24, modified 2009-04-24.
Object id is 689, canonical name is YetterDrinfeldModule.
Accessed 2055 times total.

Classification:

Physics Classification:	00. (GENERAL)
	02. (Mathematical methods in physics)
	03. (Quantum mechanics, field theories, and special relativity )
	03.65.Fd (Algebraic methods )

Pending Errata and Addenda

None.

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