AbstractFor any positive integer N, there are a finite number of non-isomorphic groups of order N. This paper deals with the 2358 groups of order 128. Their classification into families is presented, with the number of groups in each family and some of their properties
The classification of finite semigroups is difficult even for small orders because of their large nu...
AbstractWe1999 Academic Pressintroduce three practical algorithms to construct certain finite groups...
AbstractLetting G(n) denote the number of nonisomorphic groups of order n, it is shown that for squa...
AbstractA computer assisted determination of the 2328 groups of order 128 and of their 115 isoclinis...
AbstractRecently, we developed practical algorithms to determine up to isomorphism the groups of a g...
In the present BsC thesis we deal with algebraic structures, called groups. A group is a set closed ...
Group theory and its applications are relevant in many areas of mathematics. Our project considers f...
Finite group theory is one of the most delightful areas in mathematics. The ideal aim of finite grou...
Abstract. For any group G, pie(G) denotes the set of orders of its elements. If Ω is a non-empty sub...
The book describes developments on some well-known problems regarding the relationship between order...
The structure of finite groups is widely used in various fields and has a great influence on various...
The first part of the thesis presents elementary facts and results of the theory of groups. The seco...
There are fifteen groups of order , Out of which five are abelian and the rest are non-abelian. In...
AbstractLet T be a subset of the set of all isomorphism classes of finite groups. We consider the nu...
AbstractIn order to classify groups, P. Hall introduced in 1939 the concept of isoclinism. As a matt...
The classification of finite semigroups is difficult even for small orders because of their large nu...
AbstractWe1999 Academic Pressintroduce three practical algorithms to construct certain finite groups...
AbstractLetting G(n) denote the number of nonisomorphic groups of order n, it is shown that for squa...
AbstractA computer assisted determination of the 2328 groups of order 128 and of their 115 isoclinis...
AbstractRecently, we developed practical algorithms to determine up to isomorphism the groups of a g...
In the present BsC thesis we deal with algebraic structures, called groups. A group is a set closed ...
Group theory and its applications are relevant in many areas of mathematics. Our project considers f...
Finite group theory is one of the most delightful areas in mathematics. The ideal aim of finite grou...
Abstract. For any group G, pie(G) denotes the set of orders of its elements. If Ω is a non-empty sub...
The book describes developments on some well-known problems regarding the relationship between order...
The structure of finite groups is widely used in various fields and has a great influence on various...
The first part of the thesis presents elementary facts and results of the theory of groups. The seco...
There are fifteen groups of order , Out of which five are abelian and the rest are non-abelian. In...
AbstractLet T be a subset of the set of all isomorphism classes of finite groups. We consider the nu...
AbstractIn order to classify groups, P. Hall introduced in 1939 the concept of isoclinism. As a matt...
The classification of finite semigroups is difficult even for small orders because of their large nu...
AbstractWe1999 Academic Pressintroduce three practical algorithms to construct certain finite groups...
AbstractLetting G(n) denote the number of nonisomorphic groups of order n, it is shown that for squa...
DOI
Add to ORKG