Diagonalizability of elements of a group algebra

Diagonalizability of elements of a group algebra

Let G be a group and K a fields of characteristic 0. Let f be an element of the group algebra K[G]. Let X(f) be the matrix of the left-multiplication action of f on K[G]. We determine the eigenvalues and their multiplicities of X(f) when f is a central element of G, when f is an element of the desce...

Whakaahuatanga katoa

I tiakina i:
Ngā taipitopito rārangi puna kōrero
Kaituhi matua: Randriamaro, Hery
Ētahi atu kaituhi: Welker, Volkmar (Prof. Dr.) (BetreuerIn (Doktorarbeit))
Hōputu: Dissertation
Reo:Ingarihi
I whakaputaina: Philipps-Universität Marburg 2012
Ngā marau:
Kombinatorische Algebra
Combinatorics
Mathematik
Gruppenalgebra
Kombinatorik
Descent Algebra
Group Algebra
Representation theory
Representation Theory
Darstellungstheorie
Mathematics
Urunga tuihono:Kuputuhi katoa PDF
Tags: Tāpirihia he Tūtohu
Keine Tags, Fügen Sie den ersten Tag hinzu!
Whakaahuatanga
Whakarāpopototanga:Let G be a group and K a fields of characteristic 0. Let f be an element of the group algebra K[G]. Let X(f) be the matrix of the left-multiplication action of f on K[G]. We determine the eigenvalues and their multiplicities of X(f) when f is a central element of G, when f is an element of the descent algebra of K[G] for a coxeter group G, and when f is a special element of K[G] for a symmetric group G.
DOI:10.17192/z2012.0468

Ngā tūemi rite