- EAN13
- 9782759830459
- Éditeur
- EDP sciences
- Date de publication
- 08/12/2022
- Collection
- Current Natural Sciences
- Langue
- anglais
- Fiches UNIMARC
- S'identifier
An Introduction to Linear Algebra
Xiao-Qing JIN, Wei-Hui LIU, Xuan LIU, Zhi ZHAO
EDP sciences
Current Natural Sciences
Livre numérique
-
Aide EAN13 : 9782759830459
- Fichier PDF, avec Marquage en filigrane
55.99
Linear algebra is a core course for science and engineering students in
colleges and universities. It is one of the foundations of modern mathematics
and has extensive and profound applications in physics, computer science,
engineering, economics, etc. This book aims to help readers acquire the basic
knowledge of linear algebra and lay the ground for further study of
mathematics courses. It is intended for first-year undergraduate students in
engineering, science, and other areas related to mathematics. It is also
suitable for self-study. This book is organized into eight chapters and the
main contents include linear equations, basic operations of matrices,
determinants, vector spaces, eigenvalues and eigenvectors, linear
transformations, etc. In the eighth and last chapter, the authors draw on key
concepts presented in the previous chapters in the book to give an elementary
proof of the recently proposed Böttcher-Wenzel conjecture. In addition, the
appendix provides a preliminary discussion of the independence of the axioms
of vector spaces. The book provides simple exercises for tutorials and more
challenging exercises for student practice.
colleges and universities. It is one of the foundations of modern mathematics
and has extensive and profound applications in physics, computer science,
engineering, economics, etc. This book aims to help readers acquire the basic
knowledge of linear algebra and lay the ground for further study of
mathematics courses. It is intended for first-year undergraduate students in
engineering, science, and other areas related to mathematics. It is also
suitable for self-study. This book is organized into eight chapters and the
main contents include linear equations, basic operations of matrices,
determinants, vector spaces, eigenvalues and eigenvectors, linear
transformations, etc. In the eighth and last chapter, the authors draw on key
concepts presented in the previous chapters in the book to give an elementary
proof of the recently proposed Böttcher-Wenzel conjecture. In addition, the
appendix provides a preliminary discussion of the independence of the axioms
of vector spaces. The book provides simple exercises for tutorials and more
challenging exercises for student practice.
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