[1] Yang Tao, Wang Shuanhong,. π-quasitriangular group-cograded multiplier Hopf algebras [J]. Journal of Southeast University (English Edition), 2009, 25 (4): 552-556. [doi:10.3969/j.issn.1003-7985.2009.04.029]

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π-quasitriangular group-cograded multiplier Hopf algebras()

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Journal of Southeast University (English Edition)[ISSN:1003-7985/CN:32-1325/N]

Volumn:

25

Issue:

2009 4

Page:

552-556

Research Field:

Mathematics, Physics, Mechanics

Publishing date:

2009-12-30

Info

Title:

π-quasitriangular group-cograded multiplier Hopf algebras

Author(s):

Yang Tao;  Wang Shuanhong

Department of Mathematics, Southeast University, Nanjing 211189, China

Keywords:

multiplier Hopf algebra;  group-cograded;  Drinfeld double;  quasitriangular

PACS:

O153.3

DOI:

10.3969/j.issn.1003-7985.2009.04.029

Abstract:

Let G be a group and 〈A, B〉 be a pair of multiplier Hopf algebras, where B is regular G-cograded. Let π be a crossing action of G on B, D^π=A^cop∝(~overB)=⊕_p∈GD^π_p with D^π_p=A^cop∝(~overB)_p is the Drinfeld double of the pair 〈A, B〉, and then the deformation(~overD)^π becomes a multiplier Hopf algebra. B⊗A can be considered as a subalgebra of M(D^π⊗D^π), the image of element b⊗a in B⊗A is(1∝b)⊗(a∝1)in M(D^π⊗D^π). LetW=∑_αW_α∈M(B⊗A)be a π-canonical multiplier for the pair 〈A, B〉 with W_α∈M(B_α⊗A)for all α∈G. The image of W in M(D^π⊗D^π)is a π-quasitriangular structure over D^π.

References:

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[6] Delvaux L, Van Daele A, Wang S H. Quasitriangular(G-cograded)multiplier Hopf algebras[J]. Journal of Algebra, 2005, 289(2): 484-514.
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Memo

Memo:

Biographies: Yang Tao(1984—), male, graduate; Wang Shuanhong(corresponding author), male, doctor, professor, shuanhwang2002@yahoo.com.
Foundation items: Specialized Research Fund for the Doctoral Program of Higher Education(No.20060286006), the National Natural Science Foundation of China(No.10871042).
Citation: Yang Tao, Wang Shuanhong. π-quasitriangular group-cograded multiplier Hopf algebras[J]. Journal of Southeast University(English Edition), 2009, 25(4): 552-556.

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