Add to ORKGIn 1998, the second author raised the problem of classifying the irreducible characters of Sn of prime power degree. Zalesskii proposed the analogous problem for quasi-simple groups, and he has, in joint work with Malle, mad
Let G be a finite group and let p be a prime. In this paper, we classify all finite quasisimple grou...
We establish the existence of an irreducible representation of A_n whose dimension does not occur as...
A class of natural linear characters for the centralizers of elements in the symmetric group is intr...
In this thesis, we study the representation theory of the symmetric groups $\mathfrak{S}_n$, their S...
We classify all p-blocks of the symmetric and alternating groups where all irreducible p-Brauer char...
In this paper we classify the finite simple groups that admit an irreducible complex character of pr...
Let m,(G) be the number of inequivalent, irreducibie characters of group G whose degree is relativel...
One of the main problems in representation theory is the decomposition of a group representation int...
Let G be a finite soluble group and r a rational prime or zero. Let Z be a central cyclicsubgroup of...
In this paper, we continue the classification work done in the first paper of the same name. With ca...
AbstractLet G be a finite solvable group, p be some prime, let P be a Sylow p-subgroup of G, and let...
In representation theory of finite groups an important role is played by irreducible characters of p...
AbstractGiven two primes p and q, we study degrees and rationality of irreducible characters in the ...
We use Young tableaux and Young symmetrizers to classify the irreducible represen-tations over C of ...
In this thesis we study the representation theory of finite groups and more specifically some aspect...
Let G be a finite group and let p be a prime. In this paper, we classify all finite quasisimple grou...
We establish the existence of an irreducible representation of A_n whose dimension does not occur as...
A class of natural linear characters for the centralizers of elements in the symmetric group is intr...
In this thesis, we study the representation theory of the symmetric groups $\mathfrak{S}_n$, their S...
We classify all p-blocks of the symmetric and alternating groups where all irreducible p-Brauer char...
In this paper we classify the finite simple groups that admit an irreducible complex character of pr...
Let m,(G) be the number of inequivalent, irreducibie characters of group G whose degree is relativel...
One of the main problems in representation theory is the decomposition of a group representation int...
Let G be a finite soluble group and r a rational prime or zero. Let Z be a central cyclicsubgroup of...
In this paper, we continue the classification work done in the first paper of the same name. With ca...
AbstractLet G be a finite solvable group, p be some prime, let P be a Sylow p-subgroup of G, and let...
In representation theory of finite groups an important role is played by irreducible characters of p...
AbstractGiven two primes p and q, we study degrees and rationality of irreducible characters in the ...
We use Young tableaux and Young symmetrizers to classify the irreducible represen-tations over C of ...
In this thesis we study the representation theory of finite groups and more specifically some aspect...
Let G be a finite group and let p be a prime. In this paper, we classify all finite quasisimple grou...
We establish the existence of an irreducible representation of A_n whose dimension does not occur as...
A class of natural linear characters for the centralizers of elements in the symmetric group is intr...