Add to ORKGBerkovich, Chillag and Herzog characterized all finite groups $G$ in which all the nonlinear irreducible characters of $G$ have distinct degrees. In this paper we extend this result showing that a similar characterization holds for all finite solvable groups $G$ that contain a normal subgroup $N$, such that all the irreducible characters of $G$ that do not contain $N$ in their kernel have distinct degrees
AbstractIn this paper non-nilpotent groups with two irreducible character degrees are characterized....
AbstractIn this paper we describe the structure of finite groups whose real-valued nonlinear irreduc...
Isaacs and Seitz have conjectured that the derived length of a finite solvable group G is bounded by...
AbstractBerkovichet al.[Proc. Amer. Math. Soc.115(1992), 955–959] classified all groups in which the...
In this paper, we consider the degrees of the non-faithful irreducible characters of finite groups. ...
AbstractFinite groups with the nonlinear irreducible characters of distinct degrees, were classified...
AbstractY. Berkovichet al.[Proc. Amer. Math. Soc.115(1992), 955–959] classified finite groups in whi...
AbstractLet the nonsolvable N be a normal subgroup of the finite group G and cd(G|N) denote the irre...
Motivated by Isaacs and Passman's characterization of finite groups all of whose nonlinear comp...
summary:Let $m>1$ be a fixed positive integer. In this paper, we consider finite groups each of whos...
AbstractThe aim of this paper is to investigate the finite solvable groups with at most two nonlinea...
Many structural properties of a finite group G are encoded in the set of irreducible character degre...
AbstractY. Berkovichet al.[Proc. Amer. Math. Soc.115(1992), 955–959] classified finite groups in whi...
Abstract. Let G be a finite group and let Irr(G) denote the set of all complex irreducible character...
In this paper non-nilpotent groups with two irreducible character degrees are characterized. This is...
AbstractIn this paper non-nilpotent groups with two irreducible character degrees are characterized....
AbstractIn this paper we describe the structure of finite groups whose real-valued nonlinear irreduc...
Isaacs and Seitz have conjectured that the derived length of a finite solvable group G is bounded by...
AbstractBerkovichet al.[Proc. Amer. Math. Soc.115(1992), 955–959] classified all groups in which the...
In this paper, we consider the degrees of the non-faithful irreducible characters of finite groups. ...
AbstractFinite groups with the nonlinear irreducible characters of distinct degrees, were classified...
AbstractY. Berkovichet al.[Proc. Amer. Math. Soc.115(1992), 955–959] classified finite groups in whi...
AbstractLet the nonsolvable N be a normal subgroup of the finite group G and cd(G|N) denote the irre...
Motivated by Isaacs and Passman's characterization of finite groups all of whose nonlinear comp...
summary:Let $m>1$ be a fixed positive integer. In this paper, we consider finite groups each of whos...
AbstractThe aim of this paper is to investigate the finite solvable groups with at most two nonlinea...
Many structural properties of a finite group G are encoded in the set of irreducible character degre...
AbstractY. Berkovichet al.[Proc. Amer. Math. Soc.115(1992), 955–959] classified finite groups in whi...
Abstract. Let G be a finite group and let Irr(G) denote the set of all complex irreducible character...
In this paper non-nilpotent groups with two irreducible character degrees are characterized. This is...
AbstractIn this paper non-nilpotent groups with two irreducible character degrees are characterized....
AbstractIn this paper we describe the structure of finite groups whose real-valued nonlinear irreduc...
Isaacs and Seitz have conjectured that the derived length of a finite solvable group G is bounded by...