AbstractGiven a property P of groups and a finite group G (not necessarily having this property) J.G. Thompson (1996) [5] defined an associated counting function χP on G. For certain properties P he then establishes that χP is a generalized character of G. We prove here that, under mild conditions on P, these functions are not only generalized characters but in fact lie in the permutation character ring of G
AbstractLet G be a finite group with two transitive permutation representations on the sets Ω1 and Ω...
AbstractWe extend the work which has appeared in papers on sharp characters and originated with Blic...
AbstractA permutation lattice for a finite group G over the ring A of integers in a number field is ...
AbstractGiven a property P of groups and a finite group G (not necessarily having this property) J.G...
AbstractLet G be a finite group. To each permutation representation (G, X) of G and each class funct...
AbstractWe extend the work which has appeared in papers on sharp characters and originated with Blic...
AbstractIt is known that the character rings of symmetric groups Sn and the character rings of hyper...
AbstractLet G be a finite group. To each permutation representation (G, X) of G and each class funct...
For a finite group $G$ with integer-valued character table and a prime $p$, we show that almost ever...
AbstractWe describe three different methods to compute all those characters of a finite group that h...
AbstractLet G be a finite group with two transitive permutation representations on the sets Ω1 and Ω...
AbstractThis paper is part of a program to study the conjecture of E.C. Dade on counting characters ...
We prove that $(\mathbb{Z}_k \wr \mathcal{S}_n \times \mathbb{Z}_k \wr \mathcal{S}_{n-1}, \text{diag...
AbstractWe extend the results of [G.R. Robinson, More on bounds on norms of generalized characters w...
AbstractSuppose that G is a finite group, let p be a prime and let P∈Sylp(G). We prove that P is nor...
AbstractLet G be a finite group with two transitive permutation representations on the sets Ω1 and Ω...
AbstractWe extend the work which has appeared in papers on sharp characters and originated with Blic...
AbstractA permutation lattice for a finite group G over the ring A of integers in a number field is ...
AbstractGiven a property P of groups and a finite group G (not necessarily having this property) J.G...
AbstractLet G be a finite group. To each permutation representation (G, X) of G and each class funct...
AbstractWe extend the work which has appeared in papers on sharp characters and originated with Blic...
AbstractIt is known that the character rings of symmetric groups Sn and the character rings of hyper...
AbstractLet G be a finite group. To each permutation representation (G, X) of G and each class funct...
For a finite group $G$ with integer-valued character table and a prime $p$, we show that almost ever...
AbstractWe describe three different methods to compute all those characters of a finite group that h...
AbstractLet G be a finite group with two transitive permutation representations on the sets Ω1 and Ω...
AbstractThis paper is part of a program to study the conjecture of E.C. Dade on counting characters ...
We prove that $(\mathbb{Z}_k \wr \mathcal{S}_n \times \mathbb{Z}_k \wr \mathcal{S}_{n-1}, \text{diag...
AbstractWe extend the results of [G.R. Robinson, More on bounds on norms of generalized characters w...
AbstractSuppose that G is a finite group, let p be a prime and let P∈Sylp(G). We prove that P is nor...
AbstractLet G be a finite group with two transitive permutation representations on the sets Ω1 and Ω...
AbstractWe extend the work which has appeared in papers on sharp characters and originated with Blic...
AbstractA permutation lattice for a finite group G over the ring A of integers in a number field is ...
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