Finite nonsolvable groups in which only two nonlinear irreducible characters have equal degrees
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Publication:1922895
DOI10.1006/JABR.1996.0273zbMath0861.20009OpenAlexW1965991206MaRDI QIDQ1922895
Lev S. Kazarin, Yakov G. Berkovich
Publication date: 13 May 1997
Published in: Journal of Algebra (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1006/jabr.1996.0273
Ordinary representations and characters (20C15) Arithmetic and combinatorial problems involving abstract finite groups (20D60) Finite simple groups and their classification (20D05)
Related Items (13)
Finite groups admitting at most two irreducible characters having equal co-degrees ⋮ Characterization of some simple groups by the multiplicity pattern. ⋮ Unnamed Item ⋮ Nonsolvable \(D_2\)-groups. ⋮ FINITE SOLVABLE GROUPS WITH DISTINCT MONOMIAL CHARACTER DEGREES ⋮ On the multiplicities of the character codegrees of finite groups ⋮ Finite groups in which distinct nonlinear irreducible characters have distinct codegrees ⋮ On Isaacs’ three character degrees theorem ⋮ Solvable \(D_2\)-groups ⋮ On the multiplicity of character degrees of nonsolvable groups ⋮ Finite solvable groups with at most two nonlinear irreducible characters of each degree. ⋮ On Thompson's theorem ⋮ Groups in which the co-degrees of the irreducible characters are distinct
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