AbstractSome good cohomological properties of the dual Specht modules for the symmetric group Σn are established. These results are used to compute second degree cohomology of some Σn-modules over fields of positive characteristic
AbstractThe main result of this paper is an application of the topology of the space Q(X) to obtain ...
Let Hq (d) be the Iwahori–Hecke algebra of the symmetric group, where q is a primitive lth root of u...
AbstractThis paper studies the vertices, in the sense defined by J.A. Green, of Specht modules for s...
AbstractSome good cohomological properties of the dual Specht modules for the symmetric group Σn are...
AbstractCohomology of Specht modules for the symmetric group can be equated in low degrees with corr...
Ordinary representation theory of the symmetric groups is quite well understood, but there are still...
We investigate the cohomology of the Specht module Sλ for the symmetric group Σd. We show if 0 i p...
AbstractWe investigate the cohomology of the Specht module Sλ for the symmetric group Σd. We show if...
AbstractCohomology of Specht modules for the symmetric group can be equated in low degrees with corr...
Let Σ d denote the symmetric group of degree d and let K be a field of positive characteristic p. Fo...
AbstractJames and Mathas conjecture a criterion for the Specht module Sλ for the symmetric group to ...
AbstractWe study the permutation module arising from the action of the symmetric group S2n on the co...
AbstractMotivated by an analogous attempt to construct the modules for the projective representation...
In this thesis, we focus on the representation theory of symmetric groups. Especially, we are very ...
AbstractWe present (with proof ) a new family of decomposable Specht modules for the symmetric group...
AbstractThe main result of this paper is an application of the topology of the space Q(X) to obtain ...
Let Hq (d) be the Iwahori–Hecke algebra of the symmetric group, where q is a primitive lth root of u...
AbstractThis paper studies the vertices, in the sense defined by J.A. Green, of Specht modules for s...
AbstractSome good cohomological properties of the dual Specht modules for the symmetric group Σn are...
AbstractCohomology of Specht modules for the symmetric group can be equated in low degrees with corr...
Ordinary representation theory of the symmetric groups is quite well understood, but there are still...
We investigate the cohomology of the Specht module Sλ for the symmetric group Σd. We show if 0 i p...
AbstractWe investigate the cohomology of the Specht module Sλ for the symmetric group Σd. We show if...
AbstractCohomology of Specht modules for the symmetric group can be equated in low degrees with corr...
Let Σ d denote the symmetric group of degree d and let K be a field of positive characteristic p. Fo...
AbstractJames and Mathas conjecture a criterion for the Specht module Sλ for the symmetric group to ...
AbstractWe study the permutation module arising from the action of the symmetric group S2n on the co...
AbstractMotivated by an analogous attempt to construct the modules for the projective representation...
In this thesis, we focus on the representation theory of symmetric groups. Especially, we are very ...
AbstractWe present (with proof ) a new family of decomposable Specht modules for the symmetric group...
AbstractThe main result of this paper is an application of the topology of the space Q(X) to obtain ...
Let Hq (d) be the Iwahori–Hecke algebra of the symmetric group, where q is a primitive lth root of u...
AbstractThis paper studies the vertices, in the sense defined by J.A. Green, of Specht modules for s...
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