Visual Group Theory - Rosebrock, Stephan; - Prospero Internet Bookshop
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Product details:
ISBN13:9783662693643
ISBN10:366269364X
Binding:Paperback
No. of pages:237 pages
Size:235x155 mm
Language:English
Illustrations: 74 Illustrations, black & white
676
Category:

Visual Group Theory

A Computer-Oriented Geometric Introduction
 
Edition number: 2024
Publisher: Springer
Date of Publication:
Number of Volumes: 1 pieces, Book
 
Normal price:
Publisher's listprice:
EUR 53.49
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22 072 HUF (21 021 HUF + 5% VAT)
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Short description:

This textbook provides an introduction to group theory starting from the basics, relying on geometry to elucidate its various aspects.



Groups naturally manifest as symmetries of geometric shapes, such as reflections and rotations. The book adopts this perspective to provide a straightforward, descriptive explanation, supported by examples and exercises in GAP, an open-source computer algebra system. It covers all of the key concepts of group theory, including homomorphisms, group operations, presentations, products of groups, and finite, abelian, and solvable groups. The topics include cyclic and symmetric groups, dihedral, orthogonal, and hyperbolic groups, as well as the significant notion of Cayley graphs.



Self-contained and requiring little beyond high school mathematics, this book is aimed at undergraduate courses and features numerous exercises. It will also appeal to anyone interested in the geometric approach to group theory.

Long description:

This textbook provides an introduction to group theory starting from the basics, relying on geometry to elucidate its various aspects.



Groups naturally manifest as symmetries of geometric shapes, such as reflections and rotations. The book adopts this perspective to provide a straightforward, descriptive explanation, supported by examples and exercises in GAP, an open-source computer algebra system. It covers all of the key concepts of group theory, including homomorphisms, group operations, presentations, products of groups, and finite, abelian, and solvable groups. The topics include cyclic and symmetric groups, dihedral, orthogonal, and hyperbolic groups, as well as the significant notion of Cayley graphs.



Self-contained and requiring little beyond high school mathematics, this book is aimed at undergraduate courses and features numerous exercises. It will also appeal to anyone interested in the geometric approach to group theory.

Table of Contents:

1 Introduction to Euclidean Geometry.- 2 Introduction to Groups.- 3 Subgroups and Homomorphisms.- 4 Group Operations.- 5 Group Presentations.- 6 Products of Groups.- 7 Finite Groups.- 8 Abelian and Solvable Groups.- 9 The Hyperbolic Plane.- 10 Hyperbolic Groups.