Lee Theory and Its Applications View Homepage


Ontology type: schema:MonetaryGrant     


Grant Info

YEARS

2010-2013

FUNDING AMOUNT

1500000 CNY

ABSTRACT

High rank expansion affine Lie algebra structure and representation, including a Jordan, Cayley algebra and quantum torus coordinates coordinate algebra infinite dimensional Lie algebra; research vertex operator algebra representation, rational classification vertex operator algebra, and there (2) the limited contact between rationality and C; the quantum vertex operator with integrable models, especially supersymmetric integrable models, integrable boundary relational model; explore twisted boundary conditions with non-exchange relationship, and Langlands duality relation; use Ring-Hall algebraic quantum groups and integrable highest weight modules canonical base; non A- type q-Fock space, and thus prove the general type of affine q-Schur algebra decomposition conjecture; research algebraic and geometric properties of the layered structure and tubes derived category of mutations; Dilational affine Lie algebra structure and use of derived categories from the same structure; research has triangular decomposition of a finitely generated infinite dimensional Lie algebra representation of Whittaker. Lie on representation theory, the use of cohomology induced constructor function space affine symmetric spaces of singular irreducible subspace; solid proof about the use of generalized functions of the group, said the uniqueness of the model. More... »

URL

http://npd.nsfc.gov.cn/projectDetail.action?pid=10931006

Related SciGraph Publications

  • 2014-06. MVW-extensions of quaternionic classical groups in MATHEMATISCHE ZEITSCHRIFT
  • 2014. A Characterization of the Vertex Operator Algebra $$V _{L_{2}}^{A_{4}}$$ in CONFORMAL FIELD THEORY, AUTOMORPHIC FORMS AND RELATED TOPICS
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