ITP OpenIR  > 理论物理所科研产出  > SCI论文
CHANG, Z
THE MULTIPOLE NEVEU-SCHWARZ ALGEBRA ON RIEMANN SUPERSPHERE
Source PublicationCOMMUNICATIONS IN THEORETICAL PHYSICS
KeywordConformal Field-theory Krichever-novikov Algebras Meromorphic Vector-fields 2 Dimensions Superconformal Algebra Virasoro Algebra Quantum Geometry Invariance Sphere Symmetry
AbstractAccording to the Riemann-Roch theorem, we construct bases H(-n)(i) and N(-m)(f), for the meromorphic lambda = -1 and lambda = -1/2 differentials on the Riemann sphere S2. The dual bases, A(-n)(i) and D(-m)(i), of these meromorphic lambda differentials on C(tau) curves are defined. Expanding the component fields T(B)(z) and T(F)(z) of the stress-energy tensor T(z) in the superconformal field theory by the dual bases A(-n)(i) and D(-m)(j), respectively, we obtain a series of expanding coefficients. The commutation relations among these coefficients are given explicitly, which is just the multi-pole Neveu-Schwarz algebra with central extensions on the Riemann supersphere S. Physical implications of the algebra are also discussed.
1992
ISSN0253-6102
Volume17Issue:1Pages:53-60
Subject AreaPhysics
Indexed BySCI
Document Type期刊论文
Identifierhttp://ir.itp.ac.cn/handle/311006/11255
Collection理论物理所科研产出_SCI论文
Recommended Citation
GB/T 7714
CHANG, Z. THE MULTIPOLE NEVEU-SCHWARZ ALGEBRA ON RIEMANN SUPERSPHERE[J]. COMMUNICATIONS IN THEORETICAL PHYSICS,1992,17(1):53-60.
APA CHANG, Z.(1992).THE MULTIPOLE NEVEU-SCHWARZ ALGEBRA ON RIEMANN SUPERSPHERE.COMMUNICATIONS IN THEORETICAL PHYSICS,17(1),53-60.
MLA CHANG, Z."THE MULTIPOLE NEVEU-SCHWARZ ALGEBRA ON RIEMANN SUPERSPHERE".COMMUNICATIONS IN THEORETICAL PHYSICS 17.1(1992):53-60.
Files in This Item:
File Name/Size DocType Version Access License
The Multi-Pole Neveu(289KB) 开放获取LicenseApplication Full Text
Related Services
Recommend this item
Bookmark
Usage statistics
Export to Endnote
Google Scholar
Similar articles in Google Scholar
[CHANG, Z]'s Articles
Baidu academic
Similar articles in Baidu academic
[CHANG, Z]'s Articles
Bing Scholar
Similar articles in Bing Scholar
[CHANG, Z]'s Articles
Terms of Use
No data!
Social Bookmark/Share
All comments (0)
No comment.
 

Items in the repository are protected by copyright, with all rights reserved, unless otherwise indicated.