AbstractBased on Kleshchev's branching theorems for thep-modular irreducible representations of the symmetric group and on the recent proof of the Mullineux Conjecture, we investigate in this article the corresponding branching problem for thep-modular irreducible representations of the alternating groupAn. We obtain information on the socle of the restrictions of suchAn-representations toAn−1as well as on the multiplicities of certain composition factors; furthermore, irreducibleAn-representations with irreducible restrictions toAn−1are studied
AbstractLet M be a finite monoid of Lie type of characteristic p. In this paper we compute the numbe...
This paper identifies all pairs of ordinary irreducible characters of the alternating group which ag...
AbstractWe describe a particularly easy way of evaluating the modular irreducible matrix representat...
Based on Kleshchev's branching theorems for the p-modular irreducible representations of the symmetr...
First published in Proceedings of the American Mathematical Society 125 (1997), published by the Ame...
This thesis concerns combinatorial properties of the modular representation theory of the symmetric ...
AbstractWe give a modular branching rule for certain wreath products as a generalization of Kleshche...
AbstractJantzen–Seitz partitions are thosep-regular partitions ofnwhich labelp-modular irreducible r...
We determine the dual modules of all irreducible modules of alternating groups over fields of chara...
AbstractWe classify irreducible tensor products of modular representations of the alternating group ...
Abstract. Let Sd denote the symmetric group on d letters. In 1979 Mullineux conjectured a combinator...
The Mullineux involution is a relevant map that appears in the study of the modular representations ...
In this thesis, we study the representation theory of the symmetric groups $\mathfrak{S}_n$, their S...
The complex irreducible representations of the symmetric group carry an important canonical basis ca...
Abstract. Branching of symplectic groups is not multiplicity-free. We describe a new approach to res...
AbstractLet M be a finite monoid of Lie type of characteristic p. In this paper we compute the numbe...
This paper identifies all pairs of ordinary irreducible characters of the alternating group which ag...
AbstractWe describe a particularly easy way of evaluating the modular irreducible matrix representat...
Based on Kleshchev's branching theorems for the p-modular irreducible representations of the symmetr...
First published in Proceedings of the American Mathematical Society 125 (1997), published by the Ame...
This thesis concerns combinatorial properties of the modular representation theory of the symmetric ...
AbstractWe give a modular branching rule for certain wreath products as a generalization of Kleshche...
AbstractJantzen–Seitz partitions are thosep-regular partitions ofnwhich labelp-modular irreducible r...
We determine the dual modules of all irreducible modules of alternating groups over fields of chara...
AbstractWe classify irreducible tensor products of modular representations of the alternating group ...
Abstract. Let Sd denote the symmetric group on d letters. In 1979 Mullineux conjectured a combinator...
The Mullineux involution is a relevant map that appears in the study of the modular representations ...
In this thesis, we study the representation theory of the symmetric groups $\mathfrak{S}_n$, their S...
The complex irreducible representations of the symmetric group carry an important canonical basis ca...
Abstract. Branching of symplectic groups is not multiplicity-free. We describe a new approach to res...
AbstractLet M be a finite monoid of Lie type of characteristic p. In this paper we compute the numbe...
This paper identifies all pairs of ordinary irreducible characters of the alternating group which ag...
AbstractWe describe a particularly easy way of evaluating the modular irreducible matrix representat...