The based ring of two-sided cells of affine Weyl groups of type Ãn-1
Author(s)
Bibliographic Information
The based ring of two-sided cells of affine Weyl groups of type Ãn-1
(Memoirs of the American Mathematical Society, no. 749)
American Mathematical Society, 2002
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Note
"May 2002, volume 157, number 749 (end of volume)"
Includes bibliography (p. 91) and index
On t.p. "n-1"is subscript
Description and Table of Contents
Description
Aims to prove Lusztig's conjecture on based ring for an affine Weyl group of type $\tilde A_{n-1}$.
Table of Contents
Cells in affine Weyl groups Type $\widetilde{A}_{n-1}$ Canonical left cells The group $F_\lambda$ and its representation A bijection between $\Gamma_\lambda\cap\Gamma^{-1}_\lambda$ and Irr $F_\lambda$ A factorization formula in $J_{\Gamma_\lambda\cap\Gamma^{-1}_\lambda}$ a multiplication formula in $J_{\Gamma_\lambda\cap\Gamma^{-1}_\lambda}$ The based rings $J_{\Gamma_\lambda\cap\Gamma^{-1}_\lambda}$ and $J_{\textbf{c}}$ Bibliography Index Notation.
by "Nielsen BookData"
