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This book provides an introduction to 3D rotations, laying the foundation for advanced topics by covering the fundamentals of rotations in three dimensions.
No book on rotations currently provides a clear introduction, linking the disparate topics involved with beginning study on this subject. This book starts with the basics, including vector topics relating specifically to 3D finite rotations and progresses in a logical way to rotation matrices, axis/angle representation, Euler-Rodrigues rotation formula, Euler parameters (and quaternions) and Euler angles, providing the necessary linkage between these topics. The special orthogonal group and Euclidean group are introduced along with Chasles' theorem and the book concludes with concepts in infinitesimal rotations. This book uses 3D diagrams to aid understanding and visualization.
This book is read by undergraduates, graduate students and those working in industry who find themselves encountering rotations for the first time and provides a clear path to be completed that places the reader in a strong position to navigate more complex material on the subject of rotations.
Table des matières
Introduction to Rotations in Three Dimensions.- Vectors.- Rotation in Two Dimensions.- Direction Cosine Matrix.- Rodrigues Method for Combining Rotations.- Groups.- Quaternions.- Angular velocity.- Appendices.
A propos de l'auteur
Richard Conway completed his PhD in digital signal processing in 2001 and currently serves as a lecturer in the Electronic & Computer Engineering department at the University of Limerick. He has worked on various funded research projects, including FPGA/ASIC designs and medical device development. Additionally, he has experience with commercial projects, such as the development of equine products and encryption blocks for wireless transceiver circuits.
Résumé
This book provides an introduction to 3D rotations, laying the foundation for advanced topics by covering the fundamentals of rotations in three dimensions.
No book on rotations currently provides a clear introduction, linking the disparate topics involved with beginning study on this subject. This book starts with the basics, including vector topics relating specifically to 3D finite rotations and progresses in a logical way to rotation matrices, axis/angle representation, Euler-Rodrigues rotation formula, Euler parameters (and quaternions) and Euler angles, providing the necessary linkage between these topics. The special orthogonal group and Euclidean group are introduced along with Chasles' theorem and the book concludes with concepts in infinitesimal rotations. This book uses 3D diagrams to aid understanding and visualization.
This book is read by undergraduates, graduate students and those working in industry who find themselves encountering rotations for the first time and provides a clear path to be completed that places the reader in a strong position to navigate more complex material on the subject of rotations.
