倾斜代数表示型的一个判别

给定遗传代数A和倾斜模_AT.记 B=End_AT为相应的倾斜代数。本文给出一种约简程序,得到两个遗传代数_sA和A_t;证明了,B是有限表示型当且仅当_sA=0和A_t=0,并且B分别是tame型和 wild型当且仅当代数直积_sA?A_t分别是tame型和wild型。     

Tame 遗传代数导出的 Lie代数

设A是有限域k上的有限维tame遗传代数,X,Y,M是有限生成A模,如果X,Y不可分解,证明了存在Hall多项式gMXY.设L(A)是以有限生成不可分解模为基的自由Abel群,则L(A)是退化Ringel-Hall代数(A)1的Lie子代数,设L′(A)是L(A)的由单模生成的Lie子代数,m是齐次正则单模的长度,证明了当M不可分解且m不整除M的长度时,［M］∈L′(A).     

倾斜代数的一类单点扩张(Ⅱ)

设A遗传,(A,T,B)是倾斜对,B~N=Hom_A(T,M),M∈G(T).本文首先给出A=A[M]上倾斜模T=T⊕P_A(ω)诱导的B=B[N]-mod中Torsion theory((T),(T))可裂的充要条件;然后利用它对B-mod的AR箭图的结构作了刻划;得到了遗传代数借助不可分解内射模的单点扩张代数的表示型的完整刻划,作为推论给出了Happel提出的公开问题的部分回答.     

Δ-tame拟遗传代数

设(K,M,H)是上三角双模问题,Brüstle和Hille证明了(K,M,H)的矩阵范畴Mat(K,M)的投射生成子P的自同态代数的反代数A是拟遗传代数,而且代数A的Δ好模范畴与Mat(K,M)等价．本文基于双模问题的tame定理,证明了如果由上三角双模问题所对应的拟遗传代数A是Δ-tame表示型的,则F(Δ)具有齐次性质,即F(Δ)中的几乎所有的模都同构于它的Auslander-Reiten变换;进一步地,如果(K,M,H)是上三角双分双模问题,则A是Δ-tame表示型的当且仅当F(Δ)具有齐次性质．     

△-tame拟遗传代数

设(K,M,H)是上三角双模问题,Br(u)stle和Hille证明了(K,M,H)的矩阵范畴Mat(K,M)的投射生成子P的自同态代数的反代数A是拟遗传代数,而且代数A的△好模范畴与Mat(K,M)等价.本文基于双模问题的tame定理,证明了如果由上三角双模问题所对应的拟遗传代数A是△-tame表示型的,则F(△)具有齐次性质,即F(△)中的几乎所有的模都同构于它的Auslander-Reiten变换;进一步地,如果(K,M,H)是上三角双分双模问题,则A是△-tame表示型的当且仅当F(△)具有齐次性质.     

单点扩张代数与recollement

研究有限维代数的有限生成模范畴之间的recollement. 证明了: 对于3个代数A, B, C, 若$A$的模范畴允许有关于B的模范畴和C的模范畴的recollement, 则A的单点扩张代数的模范畴允许有关于B的单点扩张代数的模范畴和C的模范畴的recollement.     

阶化Cartan型代数S(m;n)的不可约表示及其约化

设L=S(m;n)是定义在特征P＞3的代数闭合域F上的阶化特殊型李代数,利用已研究L的不可约表示的方法,通过定义L的如下阶化:限制情形定义L=(田)q≥-1 L[q],I,非限制情形定义(L)=(田)q≥-1 (L)[q],I,这里是L的本原P-包络,有表达式(L)=(田)mΣi=1 ni-1Σdi=1 FDpidi,而I是{1,2,…,m)的子集,得到当P-特征标x是正则半单时,在限制李代数情形所有不可约Ux(L)-模都是从不可约Ux(L[0],I)-模诱导的;在非限制的情形,所有不可约U(x)(L),(Upx(L,x))-模都是从不可约L(x)_(L[0],I)-模诱导的,这里(x)是x到(L)*上的平凡扩张.     

局部R0-代数

文提出了局部R0-代数的概念,并给出了相应的等价条件,即(i)R0-代数L是局部的,(ii)(?)x∈L,ord(x)<∞或ord(-x)<∞,(iii)每—个真滤子是primary.另外,我们又证明了任一R0-代数是局部R0-代数的子直积.     

■_(11)的合成代数的三角分解

设A是有限域上的型的遗传代数，（A）和C（A）分别表示A的Ringel-Hall代数和合成代数．该文证明了C（A）＝其中和分别表示由预投射模和预内射模生成的子代数，是由C（A）中的正则元素生成的子代数．     

平凡扩张代数的Generic模

设A为代数闭域上的有限维代数.一个无限维不可分解A-模M称为Gen-eric模意指M作为它自同态环上的模是有限长度的.设R=ADA是A的平凡扩张代数.通过ModA与ModR之间的某些函子由Generic A-模构造出了Generic R-模.同时还证明了:当A为Tame遗传代数时,R有且仅有两个Generic模.     

Derived dynkin extensions

The finite dimensional tame hereditary algebras are associated with the extended Dynkin diagrams. An indecomposable module over such an algebra is either preprojective or preinjective or lies in a family of tubes whose tubular type is the corresponding Dynkin diagram. The study of one-point extensions by simple regular modules in such tubes was initiated in [Ri].

We generalise this approach by starting out with algebras which are derived equivalent to a tame hereditary algebra and considering one-point extensions by modules which are simple regular in tubes in the derived category. If the obtained tubular type is again a Dynkin diagram these algebras are called derived Dynkin extensions.

Our main theorem says that a representation infinite algebra is derived equivalent to a tame hereditary algebra iff it is an iterated derived Dynkin extension of a tame concealed algebra. As application we get a new proof of a theorem in [AS] about domestic tubular branch enlargements which uses the derived category instead of combinatorial arguments.     

Static Subcategories of the Module Category of a Finite-Dimensional Hereditary Algebra

Let k be a field, Λ a finite-dimensional hereditary k-algebra, and modΛ the category of all finite-dimensional Λ-modules. We are going to characterize the representation type of Λ (tame or wild) in terms of the possible subcategories statM of all M-static modules, where M is an indecomposable Λ-module.     

Derived-tame Tree Algebras

In this note we classify the derived-tame tree algebras up to derived equivalence. A tree algebra is a basic algebra A = kQ/I whose quiver Q is a tree. The algebra A is said to be derived-tame when the repetitive category  of A is tame. We show that the tree algebra A is derived-tame precisely when its Euler form _A is non-negative. Moreover, in this case, the derived equivalence class of A is determined by the following discrete invariants: The number of vertices, the corank and the Dynkin type of _A . Representatives of these derived equivalence classes of algebras are given by the following algebras: the hereditary algebras of finite or tame type, the tubular algebras and a certain class of poset algebras, the so-called semichain-algebras which we introduce below.     

The Double Ringel-Hall Algebras of Valued Quivers

This paper is devoted to the study of the structure of the double Ringel-Hall algebra D(Λ) for an infinite dimensional hereditary algebra A, which is given by a valued quiverΓover a finite field, and also to the study of the relations of D(Λ)-modules with representations of valued quiverΓ.     

On Auslander-Reiten Quivers of Enveloping Algebras of Restricted Lie Algebras

Let (L, [p]) be a finite dimensional restricted Lie algebra over an algebraically closed field F of characteristic p ≥ 3, X ∈ L* a linear form. In this article we study the Auslander-Reiten quivers of certain blocks of the reduced enveloping algebra u(L,x). In particular, it is shown that the enveloping algebras of supersolvable Lie algebras do not possess AR-components of Euclidean type.     

Schubert Class and Cyclotomic NilHecke Algebras

Let (l) and n be positive integers such that l ≥ n,and let Gn,l be the Grassmannian which consists of the set of n-dimensional subspaces of Cl.There is a Z-graded algebra isomorphism between the cohomology H*(Gn,l,Z) of Gn,l and a nat-ural Z-form B of the Z-graded basic algebra of the type A cyclotomic nilHecke algebra(H)(0) =<ψ1,… ψn-1,y1,…,yn>.We show that the isomorphism can be chosen such that the image of each (geometrically defined) Schubert class (a1,...,an) coincides with the basis element bλ constructed by Hu and Liang by purely algebraic method,where 0 ≤ a1 ≤ a2 ≤ … ≤ an ≤ l-n with ai ∈ Z for each i,and λ is the l-multipartition of n associated to (l + 1-(an + n),l + 1-(an-1 + n-1),...,l + 1-(a1 + 1)).A similar correspondence between the Schubert class basis of the cohomology of the Grassmanni-an Gl-n,l and the bλ's basis (λ is an l-multipartition of n with each component being either (1) or empty) of the natural Z-form B of the Z-graded basic algebra of (H)(0)l,n is also obtained.As an application,we obtain a second version of the Giambelli formula for Schubert classes.     

On Semigenerically Tame Algebras Over Perfect Fields

Given a semigenerically tame finite-dimensional algebra Λ over a (possibly finite) perfect field, we give, for each natural number d, parametrizations of the indecomposable Λ-modules with central endolength bounded by d, modulo finite scalar extensions, over polynomial algebras.     

On Poset Boolean Algebras

Let (P,≤) be a partially ordered set. The poset Boolean algebra of P, denoted F(P), is defined as follows: The set of generators of F(P) is {x _p  : p∈P}, and the set of relations is {x _p ⋅x _q =x _p  : p≤q}. We say that a Boolean algebra B is well-generated, if B has a sublattice G such that G generates B and (G,≤ ^B |G) is well-founded. A well-generated algebra is superatomic. THEOREM 1. Let (P,≤) be a partially ordered set. The following are equivalent. (i) P does not contain an infinite set of pairwise incomparable elements, and P does not contain a subset isomorphic to the chain of rational numbers, (ii) F(P) is superatomic, (iii) F(P) is well-generated. The equivalence (i) ⇔ (ii) is due to M. Pouzet. A partially ordered set W is well-ordered, if W does not contain a strictly decreasing infinite sequence, and W does not contain an infinite set of pairwise incomparable elements. THEOREM 2. Let F(P) be a superatomic poset algebra. Then there are a well-ordered set W and a subalgebra B of F(W), such that F(P) is a homomorphic image of B. This is similar but weaker than the fact that every interval algebra of a scattered chain is embeddable in an ordinal algebra. Remember that an interval algebra is a special case of a poset algebra. This revised version was published online in June 2006 with corrections to the Cover Date.     

弱闭T(N)-模的预零化子的等距映射

本文刻划了弱闭T(N)-模的预零化子间的等距映射.设u,W分别为由左连续序同态N→~N和N→~N所确定的弱闭T(N)-模, u(?),W(?)分别为u,W的预零化子,Φ为由u(?)到W(?)上的线性等距映射.若(0)*=(0)#=(0),dim(0)+≠1且min{dim(H(?)~H),dim(He(?)^H)}≥2,则存在酉算子Ui,Vi(i=1,2),使得Φ(A)=U1AV*1或Φ(A)=U2A*V2*.     

Nest代数上的在零点广义可导映射

设A为B（H）的子代数,　是A到B（H）的线性映射,我们说　在0点广义可导（广义双边可导）,如果对任意的S,T∈A且ST=0（ST=0或TS=0）,有　（ST）=　（S）T+S　（T）-S　（I）T.本文主要得到如下结果:（1）有限Nest代数上的每个范数拓扑连续的在0点广义可导的线性映射是广义内导子;（2）若N是完备Nest且H_　 H,则algN上的每个范数拓扑连续的在0点广义双边可导的线性映射是广义内导子.