Matrix Analysis

Matrix Analysis
Author: Rajendra Bhatia
Publisher: Springer Science & Business Media
Total Pages: 360
Release: 2013-12-01
Genre: Mathematics
ISBN: 1461206537

This book presents a substantial part of matrix analysis that is functional analytic in spirit. Topics covered include the theory of majorization, variational principles for eigenvalues, operator monotone and convex functions, and perturbation of matrix functions and matrix inequalities. The book offers several powerful methods and techniques of wide applicability, and it discusses connections with other areas of mathematics.

Matrix Analysis

Matrix Analysis
Author: Roger A. Horn
Publisher: Cambridge University Press
Total Pages: 662
Release: 2012-10-22
Genre: Mathematics
ISBN: 9780521548236

Linear algebra and matrix theory are fundamental tools in mathematical and physical science, as well as fertile fields for research. This new edition of the acclaimed text presents results of both classic and recent matrix analysis using canonical forms as a unifying theme, and demonstrates their importance in a variety of applications. The authors have thoroughly revised, updated, and expanded on the first edition. The book opens with an extended summary of useful concepts and facts and includes numerous new topics and features, such as: - New sections on the singular value and CS decompositions - New applications of the Jordan canonical form - A new section on the Weyr canonical form - Expanded treatments of inverse problems and of block matrices - A central role for the Von Neumann trace theorem - A new appendix with a modern list of canonical forms for a pair of Hermitian matrices and for a symmetric-skew symmetric pair - Expanded index with more than 3,500 entries for easy reference - More than 1,100 problems and exercises, many with hints, to reinforce understanding and develop auxiliary themes such as finite-dimensional quantum systems, the compound and adjugate matrices, and the Loewner ellipsoid - A new appendix provides a collection of problem-solving hints.

Topics in Matrix Analysis

Topics in Matrix Analysis
Author: Roger A. Horn
Publisher: Cambridge University Press
Total Pages: 620
Release: 1994-06-24
Genre: Mathematics
ISBN: 9780521467131

This book treats several topics in matrix theory not included in its predecessor volume, Matrix Analysis.

Matrix Analysis

Matrix Analysis
Author: Roger A. Horn
Publisher: Cambridge University Press
Total Pages: 580
Release: 1990-02-23
Genre: Mathematics
ISBN: 9780521386326

Matrix Analysis presents the classical and recent results for matrix analysis that have proved to be important to applied mathematics.

Matrix Analysis for Scientists and Engineers

Matrix Analysis for Scientists and Engineers
Author: Alan J. Laub
Publisher: SIAM
Total Pages: 159
Release: 2005-01-01
Genre: Mathematics
ISBN: 0898715768

"Prerequisites for using this text are knowledge of calculus and some previous exposure to matrices and linear algebra, including, for example, a basic knowledge of determinants, singularity of matrices, eigenvalues and eigenvectors, and positive definite matrices. There are exercises at the end of each chapter."--BOOK JACKET.

Numerical Matrix Analysis

Numerical Matrix Analysis
Author: Ilse C. F. Ipsen
Publisher: SIAM
Total Pages: 135
Release: 2009-07-23
Genre: Mathematics
ISBN: 0898716764

Matrix analysis presented in the context of numerical computation at a basic level.

Matrix Analysis and Applications

Matrix Analysis and Applications
Author: Xian-Da Zhang
Publisher: Cambridge University Press
Total Pages: 761
Release: 2017-10-05
Genre: Computers
ISBN: 1108417418

The theory, methods and applications of matrix analysis are presented here in a novel theoretical framework.

Matrix Analysis for Statistics

Matrix Analysis for Statistics
Author: James R. Schott
Publisher: John Wiley & Sons
Total Pages: 547
Release: 2016-06-20
Genre: Mathematics
ISBN: 1119092485

An up-to-date version of the complete, self-contained introduction to matrix analysis theory and practice Providing accessible and in-depth coverage of the most common matrix methods now used in statistical applications, Matrix Analysis for Statistics, Third Edition features an easy-to-follow theorem/proof format. Featuring smooth transitions between topical coverage, the author carefully justifies the step-by-step process of the most common matrix methods now used in statistical applications, including eigenvalues and eigenvectors; the Moore-Penrose inverse; matrix differentiation; and the distribution of quadratic forms. An ideal introduction to matrix analysis theory and practice, Matrix Analysis for Statistics, Third Edition features: • New chapter or section coverage on inequalities, oblique projections, and antieigenvalues and antieigenvectors • Additional problems and chapter-end practice exercises at the end of each chapter • Extensive examples that are familiar and easy to understand • Self-contained chapters for flexibility in topic choice • Applications of matrix methods in least squares regression and the analyses of mean vectors and covariance matrices Matrix Analysis for Statistics, Third Edition is an ideal textbook for upper-undergraduate and graduate-level courses on matrix methods, multivariate analysis, and linear models. The book is also an excellent reference for research professionals in applied statistics. James R. Schott, PhD, is Professor in the Department of Statistics at the University of Central Florida. He has published numerous journal articles in the area of multivariate analysis. Dr. Schott’s research interests include multivariate analysis, analysis of covariance and correlation matrices, and dimensionality reduction techniques.

Linear Algebra and Matrix Analysis for Statistics

Linear Algebra and Matrix Analysis for Statistics
Author: Sudipto Banerjee
Publisher: CRC Press
Total Pages: 586
Release: 2014-06-06
Genre: Mathematics
ISBN: 1420095382

Linear Algebra and Matrix Analysis for Statistics offers a gradual exposition to linear algebra without sacrificing the rigor of the subject. It presents both the vector space approach and the canonical forms in matrix theory. The book is as self-contained as possible, assuming no prior knowledge of linear algebra. The authors first address the rudimentary mechanics of linear systems using Gaussian elimination and the resulting decompositions. They introduce Euclidean vector spaces using less abstract concepts and make connections to systems of linear equations wherever possible. After illustrating the importance of the rank of a matrix, they discuss complementary subspaces, oblique projectors, orthogonality, orthogonal projections and projectors, and orthogonal reduction. The text then shows how the theoretical concepts developed are handy in analyzing solutions for linear systems. The authors also explain how determinants are useful for characterizing and deriving properties concerning matrices and linear systems. They then cover eigenvalues, eigenvectors, singular value decomposition, Jordan decomposition (including a proof), quadratic forms, and Kronecker and Hadamard products. The book concludes with accessible treatments of advanced topics, such as linear iterative systems, convergence of matrices, more general vector spaces, linear transformations, and Hilbert spaces.