Universal Verma Modules and the Misra‐Miwa Fock Space | Zendy

Arun Ram | Zendy; Peter Tingley | Zendy

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Universal Verma Modules and the Misra‐Miwa Fock Space

Author(s) -

Arun Ram,

Peter Tingley

Publication year - 2010

Publication title -

international journal of mathematics and mathematical sciences

Language(s) - English

Resource type - Journals

SCImago Journal Rank - 0.21

H-Index - 39

eISSN - 1687-0425

pISSN - 0161-1712

DOI - 10.1155/2010/326247

Subject(s) - mathematics , fock space , verma module , space (punctuation) , algebra over a field , pure mathematics , arithmetic , linguistics , quantum mechanics , philosophy , physics , lie algebra

The Misra-Miwa v-deformed Fock space is a representation of the quantized affine algebra Uv(sl^ℓ). It has a standard basis indexed by partitions, and the nonzero matrixentries of the action of the Chevalley generators with respect to this basis are powers of v. Partitions also index the polynomial Weyl modules for Uq(glN) as N tends to infinity. We explain how the powers of v which appear in the Misra-Miwa Fock space also appear naturallyin the context of Weyl modules. The main tool we use is the Shapovalov determinant for auniversal Verma module

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