Tits-Kantor-Koecher李代数的Wakimoto表示

每一个Jordan代数都对应了一个Tits-Kantor-Koecher李代数.在扩张仿射李代数的分类中[1],A1型李代数的分类依赖于欧氏空间上半格给出的Tits-Kantor-Koecher李代数.另外在相似的意义下,二维欧氏空间R2中只有两个半格.设S是R2上的任一半格,Τ(S)为半格S对应的Jordan代数,(g)(Τ(S))为相应的Tits.Kantor-Koecher李代数.利用Wakimoto自由场的方法给出李代数(g)(Τ(S))的一类顶点表示.     

TKK代数的分次自同构群

$A_{1}$型扩张仿射Lie代数的分类依赖于从Euclid空间中的半格构造得到的TKK代数. Allison等从${\mathbb {R}}^{\nu}(\nu\geq1)$的一个半格出发, 定义了一类Jordan代数. 然后通过所谓的Tits-Kantor-Koecher方法构造出TKK代数${\cal{T}}({\cal J}(S))$, 最后得到$A_{1}$型扩张仿射Lie代数. 在${\mathbb{R}}^{2}$中, 只有两个不相似的半格$S$和$S’$, 其中$S$是格而$S’$是非格半格. 本文主要研究TKK代数${\cal{T}}({\cal J}(S))$的${\mathbb {Z}}^{2}$-分次自同构.     

Graded automorphism group of TKK algebra

The classification of extended affine Lie algebras of type A_1 depends on the Tits-Kantor- Koecher (TKK) algebras constructed from semilattices of Euclidean spaces.One can define a unitary Jordan algebra J(S) from a semilattice S of R~v (v≥1),and then construct an extended affine Lie algebra of type A_1 from the TKK algebra T(J(S)) which is obtained from the Jordan algebra J(S) by the so-called Tits-Kantor-Koecher construction.In R~2 there are only two non-similar semilattices S and S′,where S is a lattice and S′is a non-lattice semilattice.In this paper we study the Z~2-graded automorphisms of the TKK algebra T(J(S)).     

A1型扩张仿射Lie代数的分次自同构群

文献[1]从Euclid空间R^v（v≥1）的一个半格S出发,定义了一个Jordan代数J（S）：然后通过Tits—Kantor-Koecher方法由J（S）构造出Lie代数G（J（S））．最后利用G（J（S））得到A1型扩张仿射Lie代数L（J（S））．本文给出v=2,S为格时。A1型扩张仿射Lie代数L（J（S））的Z^2一分次自同构群．     

单位方体上沿曲面的振荡积分在Sobolev空间上的有界性

研究了欧氏空间R~2中单位方体Q~2=[0,1]~2上沿曲面(t,s,γ(t,s))的振荡奇异积分算子T_(α,β)f(u,v,x)=∫_(Q~2)f(u-t,v-s,x-γ(t,s))e~(it~(-β_1)s~(-β_2))t~(-1-α_1)s~(-1-α_2)dtds从Sobolev空间L_τ~p(R~(2+n))到L~p(R~(2+n))中的有界性,其中x∈R~n,(u,v)∈R~2,(t,s,γ(t,s))=(t,s,t~(P_1)s~(q_1),t~(p_2)s~(q_2),…,t~(p_n)s~(q_n))为R~(2+n)上一个曲面,且β_1α_1≥0,β_2α_20.这些结果推广和改进了R~3上的某些已知的结果.作为应用,得到了乘积空间上粗糖核奇异积分算子的Sobolev有界性.     

Banach Jordan代数的有限维性特征

复数域 C 上的 Jordan 代数 A 是一个复向量空间,并具有一个双线性非结合乘法运算“(?)”满足关系式特别地,设 B 是一个结合代数,乘法运算为(a,b)→ab,如果定义a(?)b=1/2(ab ba),则 B~ =[B,(?)]就成为一个 Jordan 代数,称为特殊 Jordan 代数.一个 Banach Jordan 代数 A 是指一个复数域 C 上的 Jordan 代数,并装备了一个完备的范数成为 Banach 空间,其乘积的范数满足条件:     

Pontrjagin空间上算子代数理想的结构

对Π_k空间上一般对称算子代数,给出了对称理想的结构的两个结果．(1)令A是Π_k空间上一般对称算子代数．若M_1∩M_2≠{0},则存在对■~((k))不变的子空间V∈~(k)H~(k),满足M_1∩M_2=F(V) J,这里J=(■),T属于k×k矩阵代数,V=(R){VXX│X∈D},R和R⊥是对*-算子代数A_p~(k)不变的．(2)令A是Π_k空间上一般对称算子代数．设△=M_1∩M_2≠{0}．则M_2：△ U(Q),其中U(Q)是下列元的集(■),这里B∈A_p,q_i是算子代数U到R~⊥的线性映射,并满足条件：q(A B)=Aq(B),A,B∈A_p．     

G2型2-Toroidal李代数的顶点表示

在[4]和[5]中已经研究了sim p ly-laced型T oro idal李代数的顶点表示,[6]文据此给出了Bl型T oro idal李代数顶点表示的构造.受[6]文启发,本文给出了G2型T oro idal李代数的顶点表示的构造,这种构造方式与D(41)的D ynk in图的顶点粘合和一个2上循环有着紧密联系.     

向量值p次可积函数空间中的乘子

本文讨论Banach值p次可积函数空间L~p(G,X)内的乘子,其中积分是关于局部紧Abel群G上Haar测度λ按Bochner意义进行的,1相似文献   

E^n中Euler不等式的推广

设 n 维欧氏空间 E~n 中 n 维单形 Ω 的外接球半径为 R,内切球半径为 r,M.S.Klamkin 获得 E~n 中之 Euler 不等式:R≥nr.本文给出 E~n 中 Euler 不等式的下述几个推广:(i)R~2≥δ_nn~2r~2+(?);(ii)R~2≥(?)/2(1+δ_n)n~2r~2+(1/2)(?);(iii)R~2≥n~2r~2+(1/4)(?)其中 I、O、G 分别为单形Ω的内心、外心与重心,δ_n=(?)[1-((ρ_(ij)-ρ_(jk))~2(ρ_(jk-ki))~2(ρ_(ki)-ρ_(ij))~2)/(ρ_(ij)ρ_(jk)ρ(k(?)))]~((-1)/n(n~2-1))≥1,ρ_(ij)=(?)(1≤i相似文献   

Graded automorphism group of TKK Lie algebra over semilattice

Every extended affine Lie algebra of type A ₁ and nullity ν with extended affine root system R(A ₁, S), where S is a semilattice in ℝ ^ν , can be constructed from a TKK Lie algebra T (J (S)) which is obtained from the Jordan algebra J (S) by the so-called Tits-Kantor-Koecher construction. In this article we consider the ℤ ⁿ -graded automorphism group of the TKK Lie algebra T (J (S)), where S is the “smallest” semilattice in Euclidean space ℝ ⁿ .     

Zur konstruktion von Lie-Algebren aus Jordan-Tripelsystemen

In this paper we study certain Lie algebras which are constructed from the (-1)-eigenspaees of an involution of a Jordan algebra. The construction is a generalisation of the Koecher-Tits-construction. We give necessary conditions in terms of the Jordan algebras for the Lie algebras being simple. If the (-1)-spaces are Peirce-1/2-components then we obtain a close relation between the Lie algebras under consideration and the structure algebras of Jordan algebras. We finally give a list of those types of simple Lie algebras which can be formed by this construction; among them are Lie algebras of type E₆ and E₇.Of fundamental importance for our considerations is a close connection between the constructed Lie algebras and the standard imbeddings of Lie triple systems.     

Prime Quotients of Jordan Systems and Lie Algebras

We show that, unlike alternative algebras, prime quotients of a nondegenerate Jordan system or a Lie algebra need not be nondegenerate, even if the original Jordan system is primitive, or the Lie algebra is strongly prime, both with nonzero simple hearts. Nevertheless, for Jordan systems and Lie algebras directly linked to associative systems, we prove that even semiprime quotients are necessarily nondegenerate.     

Jordan triples and Riemannian symmetric spaces

We introduce a class of real Jordan triple systems, called JH-triples, and show, via the Tits-Kantor-Koecher construction of Lie algebras, that they correspond to a class of Riemannian symmetric spaces including the Hermitian symmetric spaces and the symmetric R-spaces.     

Algebras of Quotients of Jordan–Lie Algebras

In this article, we introduce the notion of algebra of quotients of a Jordan–Lie algebra. Properties such as semiprimeness or primeness can be lifted from a Jordan–Lie algebra to its algebras of quotients. Finally, we construct a maximal algebra of quotients for every semiprime Jordan–Lie algebra.     

Irreducible Representations for the Baby Tits–Kantor–Koecher Algebra

The baby Tits–Kantor–Koecher (TKK) algebra constructed from the smallest (nonlattice) semilattice is related to the “smallest” extended affine Lie algebras other than the finite dimensional simple Lie algebras and the affine Kac–Moody algebras. In this article, we classify the finite dimensional irreducible representations for the baby TKK algebra. It turns out that such representations can be lifted from modules of direct sums of finitely many copies of the simple Lie algebra sp ₄(?).     

Integrable and non-integrable structures in Einstein-Maxwell equations with Abelian isometry group <Emphasis Type="Italic">G</Emphasis><Subscript>2</Subscript>

Using the fact that absolute zero divisors in Jordan pairs become Lie sandwiches of the corresponding Tits–Kantor–Koecher Lie algebras, we prove local nilpotency of the McCrimmon radical of a Jordan system (algebra, triple system, or pair) over an arbitrary ring of scalars. As an application, we show that simple Jordan systems are always nondegenerate.     

Assosymmetric algebras under Jordan product

We prove that assosymmetric algebras under the Jordan product are Lie triple algebras. A Lie triple algebra is called special if it is isomorphic to a subalgebra of the plus-algebra of some assosymmetric algebra. We establish that the Glennie identity of degree 8 is valid for special Lie triple algebras, but not for all Lie triple algebras.