Add to ORKGAfter introducing permutation notation and defining group, the author discusses the simpler properties of group that are independent of their modes of representation; composition-series of groups; isomorphism of a group with itself; Abelian groups; groups whose orders are the powers of primes; Sylow's theorem; more. 18 illustrations. A classic introduction
In the present BsC thesis we deal with algebraic structures, called groups. A group is a set closed ...
Let G be a finite group. The function ω()={() : ∈} assigns to G the set of orders of all elements...
Let G be a finite group. The function ω()={() : ∈} assigns to G the set of orders of all elements...
The first part of the thesis presents elementary facts and results of the theory of groups. The seco...
Summary. Notions of group and abelian group are introduced. The power of an element of a group, orde...
The material in this article corresponds roughly to the contents of six lectures given at the Intern...
The book describes developments on some well-known problems regarding the relationship between order...
In this paper unless otherwise stated the letter p represents a fixed prime number. The concept of p...
This is the first of three volumes on finite p-group theory. It presents the state of the art and in...
Thesis (M.A.)--Boston UniversityPLEASE NOTE: Boston University Libraries did not receive an Authoriz...
Group theory and its applications are relevant in many areas of mathematics. Our project considers f...
Search of arithmetical properties that determine a finite group uniquely. Among arithmetical propert...
Summary This project classifies groups of small order using a group’s center as the key feature. Gro...
This is the third and final installment of an exposition of an ACL2 formalization of finite group th...
AbstractWe1999 Academic Pressintroduce three practical algorithms to construct certain finite groups...
In the present BsC thesis we deal with algebraic structures, called groups. A group is a set closed ...
Let G be a finite group. The function ω()={() : ∈} assigns to G the set of orders of all elements...
Let G be a finite group. The function ω()={() : ∈} assigns to G the set of orders of all elements...
The first part of the thesis presents elementary facts and results of the theory of groups. The seco...
Summary. Notions of group and abelian group are introduced. The power of an element of a group, orde...
The material in this article corresponds roughly to the contents of six lectures given at the Intern...
The book describes developments on some well-known problems regarding the relationship between order...
In this paper unless otherwise stated the letter p represents a fixed prime number. The concept of p...
This is the first of three volumes on finite p-group theory. It presents the state of the art and in...
Thesis (M.A.)--Boston UniversityPLEASE NOTE: Boston University Libraries did not receive an Authoriz...
Group theory and its applications are relevant in many areas of mathematics. Our project considers f...
Search of arithmetical properties that determine a finite group uniquely. Among arithmetical propert...
Summary This project classifies groups of small order using a group’s center as the key feature. Gro...
This is the third and final installment of an exposition of an ACL2 formalization of finite group th...
AbstractWe1999 Academic Pressintroduce three practical algorithms to construct certain finite groups...
In the present BsC thesis we deal with algebraic structures, called groups. A group is a set closed ...
Let G be a finite group. The function ω()={() : ∈} assigns to G the set of orders of all elements...
Let G be a finite group. The function ω()={() : ∈} assigns to G the set of orders of all elements...