Uri Onn, Pooja Singla
Published 2011-01-14, updated 2011-06-10Version 2
In this article we study the representations of general linear groups which arise from their action on flag spaces. These representations can be decomposed into irreducibles by proving that the associated Hecke algebra is cellular. We give a geometric interpretation of a cellular basis of such Hecke algebras which was introduced by Murphy in the case of finite fields. We apply these results to decompose representations which arise from the space of modules over principal ideal local rings of length two with a finite residue field.
Comments: Final version, to appear in JPAA, 14 pages
A Polynomial Result for Dimensions of Irreducible Representations of Smooth Affine Group Schemes Over Principal Ideal Local Rings
Spectral equivalence of smooth group schemes over principal ideal local rings
A cellular basis of the $q$-Brauer algebra related with Murphy bases of the Hecke algebras
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