Linear Algebra and Its Applications – Gilbert Strang – 4th Edition

Description

Renowned professor and author Gilbert demonstrates that is a fascinating subject by showing both its beauty and value. While the is there, the effort is not all concentrated on proofs. ’s emphasis is on understanding. He explains concepts, rather than deduces. This is written in an informal and personal style and teaches real mathematics. The gears change in Chapter 2 as reach the introduction of vector spaces. Throughout the book, the theory is motivated and reinforced by genuine , allowing pure mathematicians to teach applied mathematics.

Written by a professor at MIT, this describes for solving linear equations using Gaussian elimination, vector spaces, orthogonality, and determinants, then addresses the challenge of finding eigenvalues and eigenvectors. The term “applications” in the title refers more to the general utility of matrices for advanced mathematical analysis than to an abundance of specific examples. The fourth edition adds new problems and explores interior point in the last chapter.

Salient Features

  • The exercise sets in the book have been extensively updated. They feature many new problems from Professor Strang’s long experience.
  • New coverage of the Singular Value Decomposition has been added to the text.
  • A second color has been added to the illustrations and boxes, many of which are new.
  • Includes an optional section on the Fast Fourier Transform.
  • Students discover how this outstanding algorithm fits into linear algebra and introduces numbers.
  • Recognizes what the computer can do in linear algebra, without being dominated by it.

Table of Contents

1. Matrices and Gaussian Elimination.
2. Vector Spaces.
3. Orthogonality.
4. Determinants.
5. Eigenvalues and Eigenvectors.
6. Positive Definite Matrices.
7. Computations with Matrices.
8. Linear Programming and Game Theory.
Appendix A: Computer Graphics.
Appendix B: The Jordan Form.
References.
Solutions to Selected Exercises.
Index.
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