Liqiang Cai scite author profile

In this paper, we study the diagrammatic categorification of q-boson algebra and also q-fermion algebra. We construct a graphical category corresponding to q-boson algebra. q-Fock states correspond to some kind of 1-morphisms, and the graded dimension of the graded vector space of 2-morphisms is exactly the inner product of the corresponding q-Fock states. We also find that this graphical category can be used to categorify q-fermion algebra.

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Hom-Lie algebroids, Hom-Lie bialgebroids and Hom-Courant algebroids

Cai

Liu

Sheng

2017

Journal of Geometry and Physics

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In this paper, first we modify the definition of a Hom-Lie algebroid introduced by LaurentGengoux and Teles and give its equivalent dual description. Many results that parallel to Lie algebroids are given. In particular, we give the notion of a Hom-Poisson manifold and show that there is a Hom-Lie algebroid structure on the pullback of the cotangent bundle of a Hom-Poisson manifold. Then we give the notion of a Hom-Lie bialgebroid, which is a natural generalization of a purely Hom-Lie bialgebra and a Lie bialgebroid. We show that the base manifold of a Hom-Lie bialgebroid is a Hom-Poisson manifold. Finally, we introduce the notion of a Hom-Courant algebroid and show that the double of a Hom-Lie bialgebroid is a Hom-Courant algebroid. The underlying algebraic structure of a Hom-Courant algebroid is a Hom-Leibniz algebra, or a Hom-Lie 2-algebra.

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Purely Hom-Lie bialgebras

Cai

Sheng

2018

Sci. China Math.

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In this paper, first we show that there is a Hom-Lie algebra structure on the set of (σ, σ)derivations of an associative algebra. Then we construct the dual representation of a representation of a Hom-Lie algebra. We introduce the notions of a Manin triple for Hom-Lie algebras and a purely Hom-Lie bialgebra. Using the coadjoint representation, we show that there is a one-to-one correspondence between Manin triples for Hom-Lie algebras and purely Hom-Lie bialgebras. Finally, we study coboundary purely Hom-Lie bialgebras and construct solutions of the classical Hom-Yang-Baxter equations in some special Hom-Lie algebras using Hom-O-operators.

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Hom-Big Brackets: Theory and Applications

Cai

Sheng

2016

SIGMA

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Liqiang Cai

A diagrammatic categorification of q -boson and q -fermion algebras

Hom-Lie algebroids, Hom-Lie bialgebroids and Hom-Courant algebroids

Purely Hom-Lie bialgebras

Hom-Big Brackets: Theory and Applications

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