In this paper we consider finite groups G satisfying the following condition: G has two columns in its character table which differ by exactly one entry. It turns out that such groups exist and they are exactly the finite groups with a non-trivial intersection of the kernels of all but one irreducible characters or, equivalently, finite groups with an irreducible character vanishing on all but two conjugacy classes. We investigate such groups and in particular we characterize their subclass, which properly contains all finite groups with non-linear characters of distinct degrees, which were characterized by Berkovich, Chillag and Herzog in 1992.
Finite groups with non-trivial intersections of kernels of all but one irreducible characters / M. Bianchi, M. Herzog. - In: INTERNATIONAL JOURNAL OF GROUP THEORY. - ISSN 2251-7650. - 7:3(2018 Sep), pp. 63-80. [10.22108/ijgt.2017.21609]
Finite groups with non-trivial intersections of kernels of all but one irreducible characters
M. Bianchi
Primo
;
2018
Abstract
In this paper we consider finite groups G satisfying the following condition: G has two columns in its character table which differ by exactly one entry. It turns out that such groups exist and they are exactly the finite groups with a non-trivial intersection of the kernels of all but one irreducible characters or, equivalently, finite groups with an irreducible character vanishing on all but two conjugacy classes. We investigate such groups and in particular we characterize their subclass, which properly contains all finite groups with non-linear characters of distinct degrees, which were characterized by Berkovich, Chillag and Herzog in 1992.File | Dimensione | Formato | |
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