模与G-集的Smash Products

对任意可迁 G-集 A,讨论了 G-分次环与 A的 Smash Products,定义并研究了 G-分次环与 G-集的Smash Products,推广了关于分次迹 ,余迹的 Smash

模的Smash Product及分次迹和分次余迹

在群分次环的分次模范畴上定义了分次迹、分次余迹和分次模的ＳｍａｓｈＰｒｏｄｕｃｔ，证明了关于迹与余迹的许多结论对分次迹与分次余迹仍成立．对任一分次模Ｍ，给出了Ｍ的分次迹、分次余迹的ＳｍａｓｈＰｒｏｄｕｃｔ与Ｍ的ＳｍａｓｈＰｒｏｄｕｃｔ的迹和余迹之间的关系，从而统一和推广了关于分次Ｂｅａｒ根及分次Ｊａｃｏｂｓｏｎ根的ＳｍａｓｈＰｒｏｄｕｃｔ的刻划，同时还刻划了ＳｍａｓｈＰｒｏｄｕｃｔ函子与函子（）＊之间的关系．

Twisted smash product for Hopf quasigroups

In order to study algebraic structures of parallelizable sphere s7, the notions of quasimodules and biquasimodnle algebras over Hopf quasigroups, which are not required to be associative, are introduced. The lack of associativity of quasimodules is compensated for by conditions involving the antipode. The twisted smash product for Hopf quasigroups is constructed using biquasimodule algebras, which is a generalization of the twisted smash for Hopf algebras. The twisted smash product and tensor coproduct is turned into a Hopf quasigroup if and only if the following conditions （h1→a） h2 = （h2→a） h1, （a←S（h1）） h2 = （a←S（h2）） h1, hold. The obtained results generalize and improve the corresponding results of the twisted smash product for Hopf algebras.

The smash products of entwining structure

Let k be a commutative ring, C a projective k-coalgebra. The smash productsof entwining structure (A, C)_ψ are discussed. When the map ψ is a bijective, and C is a finitelygenerated k-module, a version of the Ulbrich theorem for coalgebras C is given.

Smash Product的有限性条件

本文借助群分次环理论,部分刻划Smash product A#G的有限性条件(包括半单的、Artin的、Noether的,遗传的等)。

TWISTED PRODUCTS AND SMASH PRODUCTS OVER WEAK HOPF ALGEBRAS

This paper gives a sufficient and necessary condition for twisted products to be weak Hopf algebras, moreover, gives a description for smash products to be weak Hopf algebras. It respectively generalizes R.K.Molnar's major result and I.Boca's result.

Duality theorem for weak L-R smash products

This paper gives a duality theorem for weak L-R smash products, which extends the duality theorem for weak smash products given by Nikshych.

L-R smash products for multiplier Hopf algebras

The theory of L-R smash product is extended to multiplier Hopf algebras and a sufficient condition for L-R smash product to be regular multiplier Hopf algebras is given. In particular, the result of the paper implies Delvaux＇s main theorem in the case of smash products.

Global dimension of weak smash product

In Artin algebra representation theory there is an important result which states that when the order of G is invertible in A then gl.dim（AG）=gl.dim（A）. With the development of Hopf algebra theory, this result is generalized to smash product algebra. As known, weak Hopfalgebra is an important generalization of Hopf algebra. In this paper we give the more general result, that is the relation of homological dimension between an algebra A and weak smash product algebra A#H, where H is a finite dimensional weak Hopf algebra over a field k and A is an H-module algebra.

The Relative Properties of Graded Ring R and Smash Product R # G

Led G he a group, R be a G-graded ring, R,this paper deals with some relative properties of R and smash product R # G .We give out R is graded regular ring,graded right SF-ring, graded right V-ring, graded QF-ring if and only if R # G is regular ring,right SF-rign, right V-ring and QF-ring respectively.

A Duality Theorem Associated with the Smash Product of Graded Ring and G-set

Let G be a group, HG and R a G graded ring. We study the duality Theorem for G actions and smash products R#G/H of the G graded ring R and the G set G/H.

无限群分次环的Smash Product的理想交性质

Ｇ是群，Ｒ是Ｇ－分次环．本文将有限群Ｇ分次环Ｒ与Ｇ的ｓｍａｓｈｐｒｏｄｕｃｔＲ＃Ｇ￣＊的理想交性质推广到无限群的情形．证明了：Ｇ是无限群，Ｒ是非奇异Ｇ－分次环．Ｒ与Ｇ的广义ｓｍａｓｈｐｒｏｄｕｃｔＲ＃Ｇ￣＊有理想交性质的充要条件，对任意０≠ａ＿ｅ∈Ｒ＿ｅ．

L-R扭曲Smash余积及其广义结构

主要给出L-R扭曲Smash余积,同时构造广义L-R扭曲Smash积和广义L-R扭曲Smash余积.

Smash积代数和量子模范畴中的Hopf代数的新对偶

本文引入模代数的一种新对偶,它推广了代数的有限对偶概念,并证明:通过这种新对偶,模代数的对偶为余模余代数,从而形成Smash余积,而且证明了Smash积的对偶是Smash余积,即有(A#H)~0 _HA^0×H^0余代数同构,最后证明量子模范畴中的Hopf代数通过这种新对偶是自对偶的。

Hom-T-smash积Hom-Hopf代数上的拟三角结构

主要研究Hom-T-smash积Hom-Hopf代数(B■TH,αBαH)上的拟三角结构,给出了Hom-Tsmash积Hom-Hopf代数构成拟三角Hom-Hopf代数的充要条件.

弱Hopf代数上的扭曲弱Smash积

将扭曲Smash积H*A推广到弱Hopf代数上,证明了弱Smash积、弱Drinfel量子偶、双重交叉积D(H,Acop)均是扭曲弱Smash积代数的特殊情况,并且给出了H*A构成弱Hopf代数的一个充分条件.

Smash积为单环、素环、本原环的充要条件

本文对任意群Ｇ及任意的Ｇ一分环次Ａ（不必含有单位元），讨论了Ａ与Ｓｍａａｓｈ积的相关性质，给出了环是单环，素环及本原环的刻划。

广义Smash积与Smash余积之间的新对偶(英文)

主要证明余代数H(A#B)0和余代数HA0×HB0同构,其中H(A#B)0是广义Sm ash积A#B的新对偶,HA0×HB0是广义Sm ash余积.

一个与G－分次环和G－集的Smash积有关的Maschke－Type定理

对任意群Ｇ，［１］研究了有单位元１的Ｇ－分次环与有限可迁Ｇ－集的Ｓｍａｓｈ积．在本文中，我们对任意可迁Ｇ－集Ａ讨论了具有局部单位元的Ｇ－分次环与Ｇ－集Ａ的Ｓｍａｓｈ积，证明了有关的一个Ｍａｓｃｈｋｅ－ｔｙＰｅ定理．推广了［２］［３］中的一些重要结果．