Add to ORKGPart I of this thesis presents methods for finding the primitive permutation groups of degree d, where 2500 ≤ d < 4096, using the O'Nan-Scott Theorem and Aschbacher's theorem. Tables of the groups G are given for each O'Nan-Scott class. For the non-affine groups, additional information is given: the degree d of G, the shape of a stabiliser in G of the primitive action, the shape of the normaliser N in S[subscript(d)] of G and the rank of N. Part II presents a new algorithm NormaliserGL for computing the normaliser in GL[subscript(n)](q) of a group G ≤ GL[subscript(n)](q). The algorithm is implemented in the computational algebra system MAGMA and employs Aschbacher's theorem to break the problem into several cases. The attached CD co...
AbstractLetG,HandEbe subgroups of a finite nilpotent permutation group of degreen. We describe the t...
In this PhD thesis we discuss methods of recognizing finite groups by the structure of normalizers o...
The purpose of this study was to show that computers can be powerful tools for studying group theory...
In this thesis we extend the classification of primitive permutation groups of degree d to include 4...
We investigate the normaliser problem, that is, given , ≤ ₙ, compute [sub](). The fastest known the...
We present a new approach to computing the normaliser of a primitive group G in an arbitrary subgrou...
AbstractIn this paper we use the O'Nan–Scott Theorem and Aschbacher's theorem to classify the primit...
AbstractWe describe the theory and implementation of an algorithm for computing the normalizer of a ...
In this paper we use the O'Nan-Scott Theorem and Aschbacher's theorem to classify the primitive perm...
AbstractA technique for computing in permutation groups of high degree is developed. The technique u...
The minimal degree, µ(G), of a finite group G is the least n such that G embeds in Sn. Such embeddin...
AbstractThis paper discusses learning algorithms for ascertaining membership, inclusion, and equalit...
AbstractThis paper describes algorithms for constructing a Hall π-subgroup H of a finite soluble gro...
Funding: The first and third authors would like to thank the Isaac Newton Institute for Mathematical...
For two groups $G$ and $H$, which are contained in a common overgroup $K$, we call the \emph{normali...
AbstractLetG,HandEbe subgroups of a finite nilpotent permutation group of degreen. We describe the t...
In this PhD thesis we discuss methods of recognizing finite groups by the structure of normalizers o...
The purpose of this study was to show that computers can be powerful tools for studying group theory...
In this thesis we extend the classification of primitive permutation groups of degree d to include 4...
We investigate the normaliser problem, that is, given , ≤ ₙ, compute [sub](). The fastest known the...
We present a new approach to computing the normaliser of a primitive group G in an arbitrary subgrou...
AbstractIn this paper we use the O'Nan–Scott Theorem and Aschbacher's theorem to classify the primit...
AbstractWe describe the theory and implementation of an algorithm for computing the normalizer of a ...
In this paper we use the O'Nan-Scott Theorem and Aschbacher's theorem to classify the primitive perm...
AbstractA technique for computing in permutation groups of high degree is developed. The technique u...
The minimal degree, µ(G), of a finite group G is the least n such that G embeds in Sn. Such embeddin...
AbstractThis paper discusses learning algorithms for ascertaining membership, inclusion, and equalit...
AbstractThis paper describes algorithms for constructing a Hall π-subgroup H of a finite soluble gro...
Funding: The first and third authors would like to thank the Isaac Newton Institute for Mathematical...
For two groups $G$ and $H$, which are contained in a common overgroup $K$, we call the \emph{normali...
AbstractLetG,HandEbe subgroups of a finite nilpotent permutation group of degreen. We describe the t...
In this PhD thesis we discuss methods of recognizing finite groups by the structure of normalizers o...
The purpose of this study was to show that computers can be powerful tools for studying group theory...