AbstractWe combine Galois theory with crossed products by letting grading groups act on ground fields. We show that Clifford theory for suitable normal subgroups preserves such actions
This is an exposition on Clifford theory for induced representations of finite groups. We include se...
AbstractA graded tensor category over a group G will be called a crossed product tensor category if ...
This note uses a variation of graded Morita theory for finite dimensional superalgebras to determine...
AbstractWe combine Galois theory with crossed products by letting grading groups act on ground field...
Abstract. Let G ̂ be a finite group, N a normal subgroup of G ̂ and ϑ ∈ IrrN. Let F be a subfield of...
We develop a Clifford theory for Mackey algebras. For simple Mackey functors, using their classifica...
AbstractWe develop a Clifford theory for Mackey algebras. For simple Mackey functors, using their cl...
AbstractIn this paper a Clifford theory for semisimple G-groups is developed, as a particular case o...
AbstractIt is well known that the Galois group of an extension L/F puts constraints on the structure...
Dade [D1, Theorem 7.4] obtained an important result on the equivalence of categories, extending the ...
In this paper, we investigate galois theory of CP-graded ring extensions. In particular, we generali...
The thesis is divided into two parts reflecting various aspects of valuation theory: 1) Construction...
AbstractWe introduce the concept of a Galois covering of a pointed coalgebra. The theory developed s...
Abstract. Partial actions of discrete abelian groups can be used to construct both groupoid C ∗-alge...
AbstractIt is well known that Clifford algebras are group algebras deformed by a 2-cocycle. Furtherm...
This is an exposition on Clifford theory for induced representations of finite groups. We include se...
AbstractA graded tensor category over a group G will be called a crossed product tensor category if ...
This note uses a variation of graded Morita theory for finite dimensional superalgebras to determine...
AbstractWe combine Galois theory with crossed products by letting grading groups act on ground field...
Abstract. Let G ̂ be a finite group, N a normal subgroup of G ̂ and ϑ ∈ IrrN. Let F be a subfield of...
We develop a Clifford theory for Mackey algebras. For simple Mackey functors, using their classifica...
AbstractWe develop a Clifford theory for Mackey algebras. For simple Mackey functors, using their cl...
AbstractIn this paper a Clifford theory for semisimple G-groups is developed, as a particular case o...
AbstractIt is well known that the Galois group of an extension L/F puts constraints on the structure...
Dade [D1, Theorem 7.4] obtained an important result on the equivalence of categories, extending the ...
In this paper, we investigate galois theory of CP-graded ring extensions. In particular, we generali...
The thesis is divided into two parts reflecting various aspects of valuation theory: 1) Construction...
AbstractWe introduce the concept of a Galois covering of a pointed coalgebra. The theory developed s...
Abstract. Partial actions of discrete abelian groups can be used to construct both groupoid C ∗-alge...
AbstractIt is well known that Clifford algebras are group algebras deformed by a 2-cocycle. Furtherm...
This is an exposition on Clifford theory for induced representations of finite groups. We include se...
AbstractA graded tensor category over a group G will be called a crossed product tensor category if ...
This note uses a variation of graded Morita theory for finite dimensional superalgebras to determine...
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