AbstractWe present (with proof ) a new family of decomposable Specht modules for the symmetric group in characteristic 2. These Specht modules are labelled by partitions of the form (a,3,1b), and are the first new examples found for thirty years. Our method of proof is to exhibit summands isomorphic to irreducible Specht modules, by constructing explicit homomorphisms between Specht modules
Let r be a positive integer, double-struck F sign a field of odd prime characteristic p, and L the f...
We investigate a class of modules for the wreath product Sm wr Sn of two symmetric groups which are ...
Abstract. Recently Fayers has proven a combinatorial condition on partitions that classifies exactly...
AbstractWe present (with proof ) a new family of decomposable Specht modules for the symmetric group...
In this thesis, we focus on the representation theory of symmetric groups. Especially, we are very ...
We study Specht modules S (n-2,2) and simple modules D ...
AbstractCohomology of Specht modules for the symmetric group can be equated in low degrees with corr...
AbstractWe investigate the cohomology of the Specht module Sλ for the symmetric group Σd. We show if...
We investigate the cohomology of the Specht module Sλ for the symmetric group Σd. We show if 0 i p...
The irreducible representations of the symmetric groups and their Iwahori-Hecke algebras have been c...
The irreducible representations of the symmetric groups and their Iwahori-Hecke algebras have been c...
Abstract. We construct a new family of homomorphisms from Specht modules into Foulkes modules for th...
AbstractIn this paper, we will give a proof of the complete submodule structure of Specht modules co...
AbstractMotivated by an analogous attempt to construct the modules for the projective representation...
Given partitions λ = (λ1,..., λr) and µ = (µ1,..., µr) of n with λ1, µ1 6 s, define λ ̆ = (s − λr,....
Let r be a positive integer, double-struck F sign a field of odd prime characteristic p, and L the f...
We investigate a class of modules for the wreath product Sm wr Sn of two symmetric groups which are ...
Abstract. Recently Fayers has proven a combinatorial condition on partitions that classifies exactly...
AbstractWe present (with proof ) a new family of decomposable Specht modules for the symmetric group...
In this thesis, we focus on the representation theory of symmetric groups. Especially, we are very ...
We study Specht modules S (n-2,2) and simple modules D ...
AbstractCohomology of Specht modules for the symmetric group can be equated in low degrees with corr...
AbstractWe investigate the cohomology of the Specht module Sλ for the symmetric group Σd. We show if...
We investigate the cohomology of the Specht module Sλ for the symmetric group Σd. We show if 0 i p...
The irreducible representations of the symmetric groups and their Iwahori-Hecke algebras have been c...
The irreducible representations of the symmetric groups and their Iwahori-Hecke algebras have been c...
Abstract. We construct a new family of homomorphisms from Specht modules into Foulkes modules for th...
AbstractIn this paper, we will give a proof of the complete submodule structure of Specht modules co...
AbstractMotivated by an analogous attempt to construct the modules for the projective representation...
Given partitions λ = (λ1,..., λr) and µ = (µ1,..., µr) of n with λ1, µ1 6 s, define λ ̆ = (s − λr,....
Let r be a positive integer, double-struck F sign a field of odd prime characteristic p, and L the f...
We investigate a class of modules for the wreath product Sm wr Sn of two symmetric groups which are ...
Abstract. Recently Fayers has proven a combinatorial condition on partitions that classifies exactly...
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