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Julian Brough (2016)
Non-vanishing elements in finite groupsarXiv: Group Theory
S. Dolfi, G. Navarro, E. Pacifici, Lucia Sanus, P. Tiep (2010)
Non-vanishing elements of finite groupsJournal of Algebra, 323
P. Py (2005)
On the Representation Theory of the Symmetric GroupsJournal of Mathematical Sciences, 129
I.M Isaacs, G. Navarro, Thomas Wolf (1999)
Finite Group Elements where No Irreducible Character VanishesJournal of Algebra, 222
J. Olsson (1993)
Combinatorics and representations of finite groups
V. Lakshmibai, J. Brown (2009)
Representation Theory of the Symmetric Group
B. Külshammer, J. Olsson, G. Robinson (2003)
Generalized blocks for symmetric groupsInventiones mathematicae, 151
G. James (1978)
The symmetric group
Given a generalized e-block B of a symmetric group and an e-regular conjugacy class C, we study the number of irreducible characters in B which do not vanish on C and find lower bounds for it.
Journal of Algebraic Combinatorics – Springer Journals
Published: Jun 21, 2017
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