Quaternions for Computer Graphics

Front Cover
Springer Science & Business Media, Jun 11, 2011 - Computers - 140 pages

Sir William Rowan Hamilton was a genius, and will be remembered for his significant contributions to physics and mathematics. The Hamiltonian, which is used in quantum physics to describe the total energy of a system, would have been a major achievement for anyone, but Hamilton also invented quaternions, which paved the way for modern vector analysis.

Quaternions are one of the most documented inventions in the history of mathematics, and this book is about their invention, and how they are used to rotate vectors about an arbitrary axis. Apart from introducing the reader to the features of quaternions and their associated algebra, the book provides valuable historical facts that bring the subject alive.

Quaternions for Computer Graphics introduces the reader to quaternion algebra by describing concepts of sets, groups, fields and rings. It also includes chapters on imaginary quantities, complex numbers and the complex plane, which are essential to understanding quaternions. The book contains many illustrations and worked examples, which make it essential reading for students, academics, researchers and professional practitioners.

 

Contents

Introduction
1
Number Sets and Algebra
3
Complex Numbers
13
The Complex Plane
33
Quaternion Algebra
47
3D Rotation Transforms
73
Quaternions in Space
89
Conclusion
130
Eigenvectors and Eigenvalues
131
References
137
Index
139
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