Add to ORKGThis thesis contains a collection of algorithms for working with the twisted groups of Lie type known as Suzuki groups, and small and large Ree groups. The two main problems under consideration are constructive recognition and constructive membership testing. We also consider problems of generating and conjugating Sylow and maximal subgroups. The algorithms are motivated by, and form a part of, the Matrix Group Recognition Project. Obtaining both theoretically and practically efficient algorithms has been a central goal. The algorithms have been developed with, and implemented in, the computer algebra system MAGMA
We describe a practical algorithm for computing representatives of the conjugacy classes of maximal ...
The study of finite groups has been the subject of much research, with substantial success in the 20...
Let H and K be arbitrary subgroups of a finite soluble group G. The purpose of this paper is todescr...
In this thesis we present several new algorithms for dealing with simple algebraic groups and their ...
AbstractUnder the assumption of a certain conjecture, for which there exists strong experimental evi...
Abstract. We describe two methods for computing with the elements of un-twisted groups of Lie type: ...
This thesis deals with the conjugacy problem in groups and its twisted variants. We analyze recent r...
AbstractThe ability to construct the Sylow subgroups of a large finite permutation group is fundamen...
The purpose of this survey is to give some picture of what is known about algorithmic and decision p...
Abstract. We present algorithms to compute with relative root subgroups of twisted reductive groups....
AbstractWe present a constructive recognition algorithm for groups of Lie type SL3(q). This is a nec...
In this thesis we demonstrate the algorithmic usefulness of the so-called Mal'cev correspondence for...
Algorithms for effectively computing with group homomorphisms are presented . Particular emphasis is...
AbstractTwo algorithms are described for finding representatives of the nilpotent orbits of a θ-grou...
AbstractLet G=<X> and H be finite groups and let ø : X → H be a map from the generating set X of G i...
We describe a practical algorithm for computing representatives of the conjugacy classes of maximal ...
The study of finite groups has been the subject of much research, with substantial success in the 20...
Let H and K be arbitrary subgroups of a finite soluble group G. The purpose of this paper is todescr...
In this thesis we present several new algorithms for dealing with simple algebraic groups and their ...
AbstractUnder the assumption of a certain conjecture, for which there exists strong experimental evi...
Abstract. We describe two methods for computing with the elements of un-twisted groups of Lie type: ...
This thesis deals with the conjugacy problem in groups and its twisted variants. We analyze recent r...
AbstractThe ability to construct the Sylow subgroups of a large finite permutation group is fundamen...
The purpose of this survey is to give some picture of what is known about algorithmic and decision p...
Abstract. We present algorithms to compute with relative root subgroups of twisted reductive groups....
AbstractWe present a constructive recognition algorithm for groups of Lie type SL3(q). This is a nec...
In this thesis we demonstrate the algorithmic usefulness of the so-called Mal'cev correspondence for...
Algorithms for effectively computing with group homomorphisms are presented . Particular emphasis is...
AbstractTwo algorithms are described for finding representatives of the nilpotent orbits of a θ-grou...
AbstractLet G=<X> and H be finite groups and let ø : X → H be a map from the generating set X of G i...
We describe a practical algorithm for computing representatives of the conjugacy classes of maximal ...
The study of finite groups has been the subject of much research, with substantial success in the 20...
Let H and K be arbitrary subgroups of a finite soluble group G. The purpose of this paper is todescr...