Add to ORKGNavarro & Tiep proved in [46] that a finite group G has exactly one (respectively, two) rational-valued irreducible characters if and only if G has exactly one (respectively, two) rational conjugacy classes. They conjectured that the same statement holds when “three” replaces “one” or “two.” The main results of this thesis deal with this Navarro-Tiep conjecture. We show that one direction of their conjecture is true: Namely, a finite group having exactly three rational conjugacy classes also has exactly three rational-valued irreducible characters. We also precisely determine the structure of groups having exactly three rational-valued irreducible characters. Using this, we show that the converse of the Navarro-Tiep conjecture holds for non...
We investigate the question which ℚ-valued characters and characters of ℚ -representations of finite...
AbstractWe prove that a set of characters of a finite group can only be the set of characters for pr...
ABSTRACT. Let G be a finite group, Irr(G) the set of all irreducible ordinary characters of 6 and, I...
We show that if a finite group G has exactly three rational conjugacy classes, then G also has exact...
This book discusses character theory and its applications to finite groups. The work places the subj...
AbstractA classical theorem of John Thompson on character degrees states that if the degree of any c...
Many results show how restrictions on the degrees of the irreducible characters of a finite group G,...
Let G be a finite group of order divisible by a prime p. The number of conjugacy classes of p-elemen...
This book places character theory and its applications to finite groups within the reach of people w...
Let G be a finite group with Sylow 2-subgroup P. Navarro–Tiep–Vallejo have conjectured that the prin...
Abstract. Let G be a finite group and let ν(G) denote the number of conjugacy classes of non-normal ...
This work is a contribution to the classification of finite groups with an irreducible character th...
summary:For a finite group $G$ and a non-linear irreducible complex character $\chi $ of $G$ write $...
The problem of finding the splitting field for group characters is very old and important (see [4], ...
On the field of character values of finite solvable groups. - In: Archiv der Mathematik. 51. 1988. S...
We investigate the question which ℚ-valued characters and characters of ℚ -representations of finite...
AbstractWe prove that a set of characters of a finite group can only be the set of characters for pr...
ABSTRACT. Let G be a finite group, Irr(G) the set of all irreducible ordinary characters of 6 and, I...
We show that if a finite group G has exactly three rational conjugacy classes, then G also has exact...
This book discusses character theory and its applications to finite groups. The work places the subj...
AbstractA classical theorem of John Thompson on character degrees states that if the degree of any c...
Many results show how restrictions on the degrees of the irreducible characters of a finite group G,...
Let G be a finite group of order divisible by a prime p. The number of conjugacy classes of p-elemen...
This book places character theory and its applications to finite groups within the reach of people w...
Let G be a finite group with Sylow 2-subgroup P. Navarro–Tiep–Vallejo have conjectured that the prin...
Abstract. Let G be a finite group and let ν(G) denote the number of conjugacy classes of non-normal ...
This work is a contribution to the classification of finite groups with an irreducible character th...
summary:For a finite group $G$ and a non-linear irreducible complex character $\chi $ of $G$ write $...
The problem of finding the splitting field for group characters is very old and important (see [4], ...
On the field of character values of finite solvable groups. - In: Archiv der Mathematik. 51. 1988. S...
We investigate the question which ℚ-valued characters and characters of ℚ -representations of finite...
AbstractWe prove that a set of characters of a finite group can only be the set of characters for pr...
ABSTRACT. Let G be a finite group, Irr(G) the set of all irreducible ordinary characters of 6 and, I...