共查询到19条相似文献,搜索用时 46 毫秒
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在辫子范畴中考察Doi的关于bi-Frobenius代数的结果.证明了辫子bi-Frobenius代数的同态基本定理. 相似文献
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本文引进了无限维辫子Hopf代数日的忠实拟对偶H~d和严格拟对偶H~(d′).证明了每个严格拟对偶H~(d′)是一个H-Hopf模.发现了H~d的极大有理H~d-子模H~(drat)与积分的关系,即:H~(drat)≌∫_(H~d)~l■H.给出了在Yetter-Drinfeld范畴(_B~ByD,C)中的辫子Hopf代数的积分的存在性和唯—性. 相似文献
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In this note we first show that if H is a finite-dimensional Hopf algebra in a group Yetter-Drinfel'd category L^LyD(π) over a crossed Hopf group-coalgebra L, then its dual H^* is also a Hopf algebra in the category L^LyD(π). Then we establish the fundamental theorem of Hopf modules for H in the category L^LyD(π). 相似文献
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本文构造了一类非Hopf 代数的双Frobenius 代数. 特别地, 在某些特殊的情形下, 这里构造的双Frobenius 代数是整体维数为3 的阶1 生成的Artin-Schelter 正则代数的Yoneda 代数. 相似文献
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本文引进了无限维辫子Hopf代数$H$的忠实拟对偶$H^d$和严格拟对偶$H^{d'}$.证明了每个严格拟对偶$H^{d'}$是一个$H$-Hopf 模. 发现了$H^{d}$的极大有理$H^{d}$-子模$H^{d {\rm rat} }$ 与积分的关系, 即: $H^{d {\rm rat}}\cong \int ^l_{H^d} \otimes H$.给出了在Yetter-Drinfeld范畴$(^B_B{\cal YD},C)$中的辫子Hopf代数的积分的存在性和唯一性. 相似文献
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本文在三角Hopf代数表示范畴上系统地研究了Lie余代数,在此范畴上 的Lie余代数与Hopf代数之间建立了重要的联系.主要给出了Lie余代数的余包络 余代数的结构.所得结果自然是关于Lie代数的对偶结果,推广了 Sweedler M. E., Gurevich D.I., Michaelis W.和 Maiid S.等人的结果. 相似文献
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本文在三角Hopf代数表示范畴上系统地研究了Lie余代数,在此范畴上 的Lie余代数与Hopf代数之间建立了重要的联系.主要给出了Lie余代数的余包络 余代数的结构.所得结果自然是关于Lie代数的对偶结果,推广了 Sweedler M. E., Gurevich D.I., Michaelis W.和 Maiid S.等人的结果. 相似文献
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本文首先引入了一类新的范畴A YD H G,这个范畴是一簇范畴{A YD H(α,β)}(α,β)∈G的非交并,获得了范畴{A YD H(α,β)}(α,β)∈G是一个辫子T-范畴当且仅当(A,H,Q)是一个G-偶结构,推广了2005年Panaite和Staic的主要结论.最后,当H是有限维时,构造了一个拟三角T-余代数{A#H*(α,β)}(α,β)∈G,它的表示范畴与{A YD H(α,β)}(α,β)∈G是同构的. 相似文献
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Bogdan Ion 《代数通讯》2013,41(7):2508-2518
We show that, for any irreducible symmetrically braided Hopf algebra over a field of characteristic zero, the associated graded algebra with respect to the coradical filtration is a braided symmetric algebra. Consequently, we obtain conditions for a braided Hopf algebra to be of Poincaré–Birkhoff–Witt (PBW) type as module over a braided Hopf subalgebra containing the coradical. 相似文献
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R. G. Larson 《Applied Categorical Structures》1998,6(2):139-150
The relation between a monoidal category which has an exact faithful monoidal functor to a category of finite rank projective modules over a Dedekind domain, and the category of continuous modules over a topological bialgebra is discussed. If the monoidal category is braided, the bialgebra is topologically quasitriangular. If the monoidal category is rigid monoidal, the bialgebra is a Hopf algebra. 相似文献
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Let H be a quasi-Hopf algebra, a weak Hopf algebra, or a braided Hopf algebra. Let B be an H-bicomodule algebra such that there exists a morphism of H-bicomodule algebras v: H → B. Then we can define an object Bco(H), which is a left-left Yetter–Drinfeld module over H, having extra properties that allow to make a smash product Bco(H)#H, which is an H-bicomodule algebra, isomorphic to B. 相似文献
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Yuanyuan Chen 《代数通讯》2017,45(5):2142-2162
Bi-Frobenius Hom-algebras are introduced in this paper. They provide a common generalization of finite dimensional monoidal Hom-Hopf algebras and of bi-Frobenius algebras introduced by Doi and Takeuchi. The different conditions for finite dimensional monoidal Hom-algebras to be bi-Frobenius Hom-algebras are discussed. The substructures, quotient structures as well as morphisms of bi-Frobenius Hom-algebras are also studied. In addition, the Radford’s formula for S4 of a bi-Frobenius Hom-algebra is shown. The semisimplicity and separability for a special class of finite dimensional bi-Frobenius Hom-algebras are researched finally, which presents a version of Maschke’s theorem for this family. 相似文献
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In this paper, we first give the definitions of a crossed left π-H-comodules over a crossed weak Hopf π-algebra H, and show that the category of crossed left π-H-comodules is a monoidal category. Finally, we show that a family σ = {σα,β: Hα Hβ→ k}α,β∈πof k-linear maps is a coquasitriangular structure of a crossed weak Hopf π-algebra H if and only if the category of crossed left π-H-comodules over H is a braided monoidal category with braiding defined by σ. 相似文献
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We give the necessary and sufficient conditions for a family of Brzezínski crossed product algebras with suitable comultiplication and counit to be a Hopf π-coalgebra. On the other hand, necessary and sufficient conditions for the Brzeziński π-crossed product A?H to be a coquasitriangular Hopf π-coalgebra are derived, then the category A?H ? of the left π-comodules over A?H is braided. 相似文献
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Let k be an algebraically closed field of characteristic zero.This paper proves that semisimple Hopf algebras over k of dimension 66,70 and 78 are of Frobenius type. 相似文献
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Štefan Sakáloš 《代数通讯》2017,45(2):722-748
A quasi-Hopf algebra H can be seen as a commutative algebra A in the center 𝒵(H-Mod) of H-Mod. We show that the category of A-modules in 𝒵(H-Mod) is equivalent (as a monoidal category) to H-Mod. This can be regarded as a generalization of the structure theorem of Hopf bimodules of a Hopf algebra to the quasi-Hopf setting. 相似文献