On the Study of Some Twisted Deformative Schrödinger Virasoro Algebra
2016-07-31TANGJiaGAOShoulanGUHaixia
TANG Jia,GAO Shoulan,GU Haixia
(School of Science,Huzhou University,Huzhou 313000,China)
On the Study of Some Twisted Deformative Schrödinger Virasoro Algebra
TANG Jia,GAO Shoulan,GU Haixia
(School of Science,Huzhou University,Huzhou 313000,China)
In this paper,we study a kind of twisted deformative Schrödinger-Virasoro Lie algebra with two parameters.The calculation of all the derivations of certain 1-dimensional center extension of the Lie algebra proves that the Lie algebra has 7 outer derivations.The result will be helpful to further study the representation theory of this Lie algebra.
Schrödinger-Virasoro Lie algebra;central extension;derivation
MSC 2000:17B40
0 Introduction
The infinite-dimensional Schrödinger Lie algebra and Virasoro algebra are of great implications in many fields of mathematics and physics.In 1994,Henkel introduced the Schrödinger-Virasoro Lie algebra[1].Then many generations and extensions of the Schrödinger-Virasoro Lie algebra appear and they are studied extensively.The twisted deformative Schrödinger-Virasoro Lie algebra Lλ,μover the complex field was introduced in[2]as follows:for complex numbersλ,μ,the vector space Lλ,μhas a basis{Ln,Mn,Yn|n∈Z}with the following Lie brackets:
and others are zero.2-cocycles of all the Lie algebras Lλ,μwere determined in[3].According to Theorem 2.1 in[3],we have the one-dimensional central extension of L,forμ∉Z,λ∈C.For simpliciλμty,denote the Lie algebra by S.That is,the Lie algebra S has a basis{ Ln,Mn,Yn,C1n∈Z}equipped with the Lie brackets:
and others are zero,where m,n∈Z andμ∉1Z. 3
Throught the paper,denote the set of integers,the complex field and the set of nonzero complex numbers by Z,C and C*,respectively.All the vector spaces are assumed over the complex field.
1 The derivations of S
Definition 1.1[4]Let g be a Lie algebra,V a g-module.A linear map D:g→V is called a derivation,if for any x,y∈g,we have D[ x,y]=x.D( y)-y.D(x).If there exists some v∈V such that D:x↦xv.,then D is called an inner derivation.
Let g be a Lie algebra,V a module of g.Denote by Der( g,V)the vector space of all derivations,Inn( g,V)the vector space of all inner derivations[4].Set
Denote by Der(g)the derivation algebra of g,Inn( g)the vector space of all inner derivations of g.
Definition 1.2[4]Let G be a commutative group,a G-graded Lie algebra.A g module V is called G-graded,if
In this section,we will determine the derivation algebra of S.
It is easy to see that S is finitely generated.Define a Z-grading on S by
By Proposition 1.1 in[4],we have the following lemma.
Theorem 1.4
and others are zero.
Theorem 1.5 H1(S,S).That is,the derivation algebra of S is
2 Proof of Theorem 1.4
Proof For any m∈Z,D∈(Der S)m,by Lemma 1.3,we can assume
where a1(n),a2(n),a3(n),x11,b1(n),b2(n),b3(n),x12,c1(n),c2(n),c3(n),x13,y∈C.
By D[Li,Mj]=[D(Li),Mj]+[Li,D(Mj)],we can get
From D[Li,Yj]=[D(Li),Yj]+[Li,D(Yj)],we can obtain
By D[Yi,Yj]=[D(Yi),Yj]+[Yi,D(Yj)],we have
Case 1 m=0.Letting i=0 in(1)~(13),we can obtain
for all j∈Z.
Let j=-i in(1)and use(17),and then we haveLet j=1,i=2 and j=3,i=2 in(1)respectively.Then we get a1(3)=a1(1)+a1(2)and a1(5)=a1(3)+a1(2).So a1(2)=2a1(1).Leting j=0 in(1)and using induction on i,we have
Letting j=-i in(4)and(17),we have y=0.Letting j=0 in(30),we get
Subcase 1.1 If there exists some n0∈Z such that 2μ-n0λ=0.Sinceμ≠0,we have n0≠0.Let j=0 in(6),and then we have(2μ-λi)[b2(i)-a1(i)-b2(0)]=0.Hence
Letting i=j=n0in(6),we get b2(2n0)=a1(n0)+b2(0).According to(19),we can obtain b2(n0)= n0a1(1)+b2(0).So b2(i)=a1(i)+b2(0)=ia1(1)+b2(0)for all i∈Z.By(18),we have
Letting j=-i≠0 in(14)and using(20),
Subcase 1.2 2μ-nλ≠0 for all n∈Z.Letting j=0 in(6),we have b2(i)=ia1(1)+b2(0)for all i∈Z.By(18),we have
Letting j=-i≠0 in(14)and using(21),we can obtainTherefore,
Therefore,by Subcase 1.1 and Subcase1.2,we always have Hence
Thus we obtain
So Der S()0=Inn S()0⊕CD-1⊕CD-2⊕CD-3.
Case 2 m≠0.Let i=0 in(1)~(16).Then we have
①λ≠0,-1,-2.Let j=0 in(31).Then we get a2(0)=0.Let j=-i in(31).Then we have
Let j=1,i=-2 in(31).and then we obtain a22()=2a21().Let i=1 in(31)and use induction on j>1,and then we can get that a2j()=ja21()for all j∈Z.Hence,we have D(Mn)=D(C1)=0 and
②λ=0.By(32)and(24),we have
Then(31)becomes
Let i=1,and then we have(j-1)a2(1+j)=-a2(1)+ja2j().Hence we have
Let i=-j in(34),and then we get
Let j=-2 in(35),ang then we obtain a20()=2a21()-a2(0).So
Thus we have D(Mn)=D(C1)=0 and
Set a1=a2(1)-a2(0),a2=a2(0).Then we can check.So
③λ=-1.By(31)~(33),we have
Let i=1 in(36).Then we have(j-1)a2(1+j)=-j+1()a2(1)+j+1()a2j().So we can deduce
Hence D(Mn)=D(C1)=0 and
④λ=-2.By(31)~(33),we have
Let i=1 in(37),and then we have
Use induction on j>1,and then we can deduce
Let j=0 in(38),and then we get a2(0)=0.Let j=-i in(38),and then we get a2(-i)=-a2(i)for all i∈Z.Then we canall j∈Z.Hence
[1]HENKEL M.Schrödinger invariance and strongly anisotropic critical systems[J].Journal of Statistical Physics,1994,75(5/6):1 023-1 061.
[2]ROGER C,UNTERBERGER J.The Schrödinger-Virasoro Lie group and algebra:representation theory and cohomological study[J].Ann Henri Poincare,2006,7(7-8):1 477-1 529.
[3]LI J.2-cocycles of twisted deformative Schrödinger-Virasoro algebras[J].Comm Algebra,2012,40(6):1 933-1 950.
[4]FARNSTEINER R.Derivations and extensions of finitely generated graded Lie algebras[J].J Algebra,1988,118(1):34-35.
[5]JIANG C,MENGD.The derivations,algebra of the associative algebra Cq[X,Y,X-1,Y-1][J].Comm Algebra,1998,6(2):1 723-1 736.
[6]BENKART G,MOODY R.Derivations,central extensions and affine Lie algebras[J].Algebras Groups Geom,1986,3(4):456-492.
一类扭形变Schrödinger-Virasoro代数的研究
唐 佳,高寿兰,顾海霞
(湖州师范学院理学院,浙江湖州313000)
研究了一类含有两个参数的扭形变Schrödinger-Virasoro李代数,计算了这类李代数的一维中心扩张的所有导子,证明它有7个外导子.此结果为继续研究这个李代数的表示理论提供了依据.
Schrödinger-Virasoro李代数;中心扩张;导子
O152.5
O152.5 Document code:A Article ID:1009-1734(2016)04-0007-07
[责任编辑 高俊娥]
Received date:2016-03-05
s:Supported by National Nature Science Foundation(11201141,11371134)and Natural Science Foundation of Zhejiang Province(LQ12A01005,LZ14A010001).
Biography:Gao Shoulan,Doctor,Research Interests:Lie algebra.E-mail:gaoshoulan@hutc.zj.cn
MSC 2000:17B40
