AbstractThe blow-up construction by L.G. Kovács has been a very useful tool for studying embeddings of finite primitive permutation groups into wreath products in product action. In the present paper we extend the concept of a blow-up to finite quasiprimitive permutation groups, and use it to study embeddings of finite quasiprimitive groups into wreath products
We characterize permutational wreath products with Property (FA). For instance, the standard wreath ...
AbstractWe introduce “rooted valuation products” and use them to construct universal Abelian lattice...
Abstract. We characterize which permutational wreath products G⋉W (X) are finitely presented. This i...
AbstractThe blow-up construction by L.G. Kovács has been a very useful tool for studying embeddings ...
AbstractA permutation group is said to be quasiprimitive if each non-trivial normal subgroup is tran...
AbstractA permutation group is said to be quasiprimitive if all its non-trivial normal subgroups are...
The ancient and venerable wreath product construction has been used countless times in the literatur...
Abstract. We study the minimal non-trivial subdegrees of finite primitive permutation groups that ad...
It is well-known that the notion of the semidirect product of groups can be looked at from three dif...
In this article we investigate and examine some of our results from transitive permutation groups wh...
In this work, we begin by giving an overview of some topics in group theory, namely semidirect produ...
This is an exposition on the representation theory of wreath products of finite groups, with many ex...
A transitive permutation group is called semiprimitive if each normal subgroup is transitive or semi...
AbstractA permutation group is said to be quasiprimitive if all its non-trivial normal subgroups are...
This book presents an introduction to the representation theory of wreath products of finite groups ...
We characterize permutational wreath products with Property (FA). For instance, the standard wreath ...
AbstractWe introduce “rooted valuation products” and use them to construct universal Abelian lattice...
Abstract. We characterize which permutational wreath products G⋉W (X) are finitely presented. This i...
AbstractThe blow-up construction by L.G. Kovács has been a very useful tool for studying embeddings ...
AbstractA permutation group is said to be quasiprimitive if each non-trivial normal subgroup is tran...
AbstractA permutation group is said to be quasiprimitive if all its non-trivial normal subgroups are...
The ancient and venerable wreath product construction has been used countless times in the literatur...
Abstract. We study the minimal non-trivial subdegrees of finite primitive permutation groups that ad...
It is well-known that the notion of the semidirect product of groups can be looked at from three dif...
In this article we investigate and examine some of our results from transitive permutation groups wh...
In this work, we begin by giving an overview of some topics in group theory, namely semidirect produ...
This is an exposition on the representation theory of wreath products of finite groups, with many ex...
A transitive permutation group is called semiprimitive if each normal subgroup is transitive or semi...
AbstractA permutation group is said to be quasiprimitive if all its non-trivial normal subgroups are...
This book presents an introduction to the representation theory of wreath products of finite groups ...
We characterize permutational wreath products with Property (FA). For instance, the standard wreath ...
AbstractWe introduce “rooted valuation products” and use them to construct universal Abelian lattice...
Abstract. We characterize which permutational wreath products G⋉W (X) are finitely presented. This i...
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