AbstractWe show that the Brauer map for the exterior tensor product of two G-algebras can be expressed as a tensor product of their Brauer maps. As a consequence, we prove that the tensor module of two connected modules for the group algebra is also connected and its defect group is the direct product of their defect groups. We also show that this process is compatible with the association defined by Barker (J. Algebra 168 (1994) 7287) when localizing to subgroups
In this paper we get some properties which are compatible with the outer tensor product of local int...
Let G be a simply connected semisimple algebraic group over an algebraically closed field of positiv...
Let G be either a simple linear algebraic group over an algebraically closed field of characteristic...
AbstractFor the complex general linear group G = GL(r, C) we investigate the tensor product module T...
AbstractIn previous work, the author introduced the Brauer–Clifford group of certain G-algebras. Thi...
AbstractBroué's abelian defect conjecture [Astérisque 181/182 (1990) 61–92, 6.2] predicts for a p-bl...
Let k be a field of prime characteristic p and E an n-dimensional vector space. We completely descri...
AbstractThe notions of tensor product modulo q and exterior product modulo q of two G-crossed module...
AbstractLet OG be a p-modular group algebra, let H be a subgroup of G containing the normaliser of a...
AbstractThis paper determines much of the structure of blocks whose defect group is dihedral, semidi...
Let k be a field of prime characteristic p and E an n-dimensional vector space. We completely descri...
Abstract. An algebra is a vector space V over a field k together with a k-bilinear product of vector...
AbstractLetGbe eitherSp(V) orO(V). Using an action of the Brauer algebra, we describe the subspaceTk...
AbstractHere a group algebra is always the group algebra of a finite group over a commutative field....
The concept of a free group is discussed first in Chapter 1 and in Chapter 2 the tensor product of t...
In this paper we get some properties which are compatible with the outer tensor product of local int...
Let G be a simply connected semisimple algebraic group over an algebraically closed field of positiv...
Let G be either a simple linear algebraic group over an algebraically closed field of characteristic...
AbstractFor the complex general linear group G = GL(r, C) we investigate the tensor product module T...
AbstractIn previous work, the author introduced the Brauer–Clifford group of certain G-algebras. Thi...
AbstractBroué's abelian defect conjecture [Astérisque 181/182 (1990) 61–92, 6.2] predicts for a p-bl...
Let k be a field of prime characteristic p and E an n-dimensional vector space. We completely descri...
AbstractThe notions of tensor product modulo q and exterior product modulo q of two G-crossed module...
AbstractLet OG be a p-modular group algebra, let H be a subgroup of G containing the normaliser of a...
AbstractThis paper determines much of the structure of blocks whose defect group is dihedral, semidi...
Let k be a field of prime characteristic p and E an n-dimensional vector space. We completely descri...
Abstract. An algebra is a vector space V over a field k together with a k-bilinear product of vector...
AbstractLetGbe eitherSp(V) orO(V). Using an action of the Brauer algebra, we describe the subspaceTk...
AbstractHere a group algebra is always the group algebra of a finite group over a commutative field....
The concept of a free group is discussed first in Chapter 1 and in Chapter 2 the tensor product of t...
In this paper we get some properties which are compatible with the outer tensor product of local int...
Let G be a simply connected semisimple algebraic group over an algebraically closed field of positiv...
Let G be either a simple linear algebraic group over an algebraically closed field of characteristic...
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