Spectra of Symmetrized Shuffling Operators
Will be published approx. on 30. April 2014
Book
Paperback/Softback
109 pages
978-0-8218-9095-0 (ISBN)
Description
For a finite real reflection group W and a W -orbit O of flats in its reflection arrangement - or equivalently a conjugacy class of its parabolic subgroups - the authors introduce a statistic noninv O (w) on w in W that counts the number of ""O -noninversions"" of w . This generalises the classical (non-)inversion statistic for permutations w in the symmetric group S n. The authors then study the operator ? O of right-multiplication within the group algebra CW by the element that has noninv O (w) as its coefficient on w.
More details
Series
Language
English
Place of publication
Providence
United States
Target group
Professional and scholarly
Dimensions
Height: 254 mm
Width: 178 mm
Weight
456 gr
ISBN-13
978-0-8218-9095-0 (9780821890950)
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Schweitzer Classification
Persons
Victor Reiner, University of Minnesota, Minneapolis, Minnesota.
Franco Saliola, Universite du Quebec a Montreal, Canada.
Volkmar Welker, Philipps-Universitaet Marburg, Germany.
Franco Saliola, Universite du Quebec a Montreal, Canada.
Volkmar Welker, Philipps-Universitaet Marburg, Germany.
Content
Introduction
Defining the operators
The case where O contains only hyperplanes
Equivariant theory of BHR random walks
The family ? (2 k ,1 n?2k)
The original family ? (k,1 n?k)
Acknowledgements
Appendix A. G n -module decomposition of ? (k,1 n?k)
Bibliography
List of Symbols
Index
Defining the operators
The case where O contains only hyperplanes
Equivariant theory of BHR random walks
The family ? (2 k ,1 n?2k)
The original family ? (k,1 n?k)
Acknowledgements
Appendix A. G n -module decomposition of ? (k,1 n?k)
Bibliography
List of Symbols
Index