Author	Serre, Denis. author
Title	Matrices [electronic resource] : Theory and Applications / by Denis Serre
Imprint	New York, NY : Springer New York, 2010
Connect to	http://dx.doi.org/10.1007/978-1-4419-7683-3
Descript	XIV, 290 p. online resource

In this book, Denis Serre begins by providing a clean and concise introduction to the basic theory of matrices. He then goes on to give many interesting applications of matrices to different aspects of mathematics and also other areas of science and engineering. With forty percent new material, this second edition is significantly different from the first edition. Newly added topics include: โข Dunford decomposition, โข tensor and exterior calculus, polynomial identities, โข regularity of eigenvalues for complex matrices, โข functional calculus and the Dunford-Taylor formula, โข numerical range, โข Weyl's and von Neumann's inequalities, and โข Jacobi method with random choice. The book mixes together algebra, analysis, complexity theory and numerical analysis. As such, this book will provide many scientists, not just mathematicians, with a useful and reliable reference. It is intended for advanced undergraduate and graduate students with either applied or theoretical goals. This book is based on a course given by the author at the รcole Normale Supรฉrieure de Lyon

Preface to the Second Edition -- Preface to the First Edition -- List of Symbols -- 1 Elementary Linear and Multilinear Algebra -- 2 What Are Matrices -- 3 Square Matrices -- 4 Tensor and Exterior Products -- 5 Matrices with Real or Complex Entries -- 6 Hermitian Matrices -- 7 Norms -- 8 Nonnegative Matrices -- 9 Matrices with Entries in a Principal Ideal Domain; Jordan Reduction -- 10 Exponential of a Matrix, Polar Decomposition, and Classical Groups -- 11 Matrix Factorizations and Their Applications -- 12 Iterative Methods for Linear Systems -- 13 Approximation of Eigenvalues -- References -- Index of Notation -- General Index -- Cited Names

1. Mathematics
2. Matrix theory
3. Topological Groups
4. Operator theory
5. Numerical analysis
6. Mathematics
7. Linear and Multilinear Algebras
8. Matrix Theory
9. Numerical Analysis
10. Topological Groups
11. Lie Groups
12. Operator Theory