Critical point (set theory)

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In mathematics, quasi-bialgebras are a generalization of bialgebras: they were defined by the Ukrainian mathematician Vladimir Drinfeld in 1990.

A quasi-bialgebra B𝒜=(𝒜,Δ,ε,Φ) is an algebra 𝒜 over a field 𝔽 of characteristic zero equipped with morphisms of algebras

Δ:𝒜𝒜𝒜
ε:𝒜𝔽

and an invertible element Φ𝒜𝒜𝒜 such that the following are true

(idΔ)Δ(a)=Φ[(Δid)Δ(a)]Φ1,a𝒜
[(ididΔ)(Φ)][(Δidid)(Φ)]=(1Φ)[(idΔid)(Φ)](Φ1)
(εid)Δ=id=(idε)Δ
(idεid)(Φ)=11.

The main difference between bialgebras and quasi-bialgebras is that for the latter comultiplication is no longer coassociative.

Twisting

Given a quasi-bialgebra, further quasi-bialgebras can be generated by twisting.

If B𝒜 is a quasi-bialgebra and F𝒜𝒜 is an invertible element such that (εid)F=(idε)F=1, set

Δ(a)=FΔ(a)F1,a𝒜
Φ=(1F)((idΔ)F)Φ((Δid)F1)(F11).

Then, the set B𝒜=(𝒜,Δ,ε,Φ) is also a quasi-bialgebra obtained by twisting B𝒜 by F, which is called a twist. Twisting by F1 and then F2 is equivalent to twisting by F2F1.

Usage

Quasi-bialgebras form the basis of the study of quasi-Hopf algebras and further to the study of Drinfeld twists and the representations in terms of F-matrices associated with finite-dimensional irreducible representations of quantum affine algebra. F-matrices can be used to factorize the corresponding R-matrix.This leads to applications in statistical mechanics, as quantum affine algebras, and their representations give rise to solutions of the Yang-Baxter equation, a solvability condition for various statistical models, allowing characteristics of the model to be deduced from its corresponding quantum affine algebra. The study of F-matrices has been applied to models such as the Heisenberg XXZ model in the framework of the Algebraic Bethe ansatz.

References

  • Vladimir Drinfeld, Quasi-Hopf algebras, Leningrad Math J. 1 (1989), 1419-1457
  • J.M. Maillet and J. Sanchez de Santos, Drinfeld Twists and Algebraic Bethe Ansatz, Amer. Math. Soc. Transl. (2) Vol. 201, 2000