Details of Grant 

EPSRC Reference:	GR/M67155/01
Title:	AFFINE HECKE ALGEGRAS AND CANONICAL BASES FOR QUANTUM GROUPS
Principal Investigator:	Nazarov, Professor M
Other Investigators:
Researcher Co-Investigators:
Project Partners:
Department:	Mathematics
Organisation:	University of York
Scheme:	Standard Research (Pre-FEC)
Starts:	13 September 1999	Ends:	12 September 2000	Value (£):	2,380
EPSRC Research Topic Classifications:	Algebra & Geometry Logic & Combinatorics
EPSRC Industrial Sector Classifications:	No relevance to Underpinning Sectors
Related Grants:
Panel History:
Summary on Grant Application Form
The aim of this project is to develop further the representation theory of the Hecke Hn of the group GLn over a p-adic field, relative to the Iwahori subgroup. We propose to find an irreducibility criterion for a wide class of induced representations of the algebra Hn. Representations from this class are parametrised by the sequences of pairs consisting of a skew Young diagram and a complex number, the total number of boxes in these diagrams being n. In the particular case when each of these diagrams consists of one row only, such a criterion was found by A.Zelevinsky in 1980. He used the representation theory of the p-adic group GLn itself. We are going to employ the canonical basis, due to M.Kashiwara and G.Lusztig, in the quantum co-ordinate ring of the complex group of triangular unipotent matrices.
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Organisation Website:	http://www.york.ac.uk