Transformation groups for beginners
Material type: TextLanguage: English Series: Student mathematical library ; volume 25Publication details: Rhode Island : American Mathematical Society, 2004 Description: x, 246p. : ill. ; 22 cmISBN: 9780821868904Subject(s): Transformation groups | Algebraic topologyDDC classification: 515.14 Online resources: Table of Contents | Reviews Summary: The notion of symmetry is important in many disciplines, including physics, art, and music. The modern mathematical way of treating symmetry is through transformation groups. This book offers an easy introduction to these ideas for the relative novice, such as undergraduates in mathematics or even advanced undergraduates in physics and chemistry. The first two chapters provide a warm-up to the material with, for example, a discussion of algebraic operations on the points in the plane and rigid motions in the Euclidean plane. The notions of a transformation group and of an abstract group are then introduced. Group actions, orbits, and invariants are covered in the next chapter. The final chapter gives an elementary exposition of the basic ideas of Sophus Lie about symmetries of differential equations. Throughout the text, examples are drawn from many different areas of mathematics. Plenty of figures are included, and many exercises with hints and solutions will help readers master the material.Item type | Current library | Call number | Status | Date due | Barcode |
---|---|---|---|---|---|
NBHM Books | SMS Library | 515.14 DUZ-T (Browse shelf(Opens below)) | Available | N422 |
Includes index.
The notion of symmetry is important in many disciplines, including physics, art, and music. The modern mathematical way of treating symmetry is through transformation groups. This book offers an easy introduction to these ideas for the relative novice, such as undergraduates in mathematics or even advanced undergraduates in physics and chemistry.
The first two chapters provide a warm-up to the material with, for example, a discussion of algebraic operations on the points in the plane and rigid motions in the Euclidean plane. The notions of a transformation group and of an abstract group are then introduced. Group actions, orbits, and invariants are covered in the next chapter. The final chapter gives an elementary exposition of the basic ideas of Sophus Lie about symmetries of differential equations.
Throughout the text, examples are drawn from many different areas of mathematics. Plenty of figures are included, and many exercises with hints and solutions will help readers master the material.
Students interested in group theory, especially with applications to geometry.
There are no comments on this title.