H. Ted Davis and Kendall T. Thomson (Eds.)012206349X, 9780122063497, 9780080510248
Designed for advanced engineering, physical science, and applied mathematics students, this innovative textbook is an introduction to both the theory and practical application of linear algebra and functional analysis. The book is self-contained, beginning with elementary principles, basic concepts, and definitions. The important theorems of the subject are covered and effective application tools are developed, working up to a thorough treatment of eigenanalysis and the spectral resolution theorem. Building on a fundamental understanding of finite vector spaces, infinite dimensional Hilbert spaces are introduced from analogy. Wherever possible, theorems and definitions from matrix theory are called upon to drive the analogy home. The result is a clear and intuitive segue to functional analysis, culminating in a practical introduction to the functional theory of integral and differential operators. Numerous examples, problems, and illustrations highlight applications from all over engineering and the physical sciences. Also included are several numerical applications, complete with Mathematica solutions and code, giving the student a “hands-on” introduction to numerical analysis. Linear Algebra and Linear Operators in Engineering is ideally suited as the main text of an introductory graduate course, and is a fine instrument for self-study or as a general reference for those applying mathematics. · Contains numerous Mathematica examples complete with full code and solutions · Provides complete numerical algorithms for solving linear and nonlinear problems · Spans elementary notions to the functional theory of linear integral and differential equations · Includes over 130 examples, illustrations, and exercises and over 220 problems ranging from basic concepts to challenging applications · Presents real-life applications from chemical, mechanical, and electrical engineering and the physical sciences |
Table of contents :
Content:
Preface
Page xi
H. Ted Davis, Kendall T.Thomson I Determinants Original Research Article
Pages 1-23 2 Vectors and matrices Original Research Article
Pages 25-46 3 Solution of linear and Nonlinear systems Original Research Article
Pages 47-121 4 General theory of solvability of linear algebraic equations Original Research Article
Pages 123-161 5 The eigenproblem Original Research Article
Pages 163-203 6 Perfect matrices Original Research Article
Pages 205-278 7 Imperfect or defective matrices Original Research Article
Pages 279-314 8 Infinite-dimensional linear vector spaces Original Research Article
Pages 315-353 9 Linear integral operators in a hilbert space Original Research Article
Pages 355-411 Linear differential operators in a hilbert space Original Research Article
Pages 413-510 Appendix
Pages 511-542 Index
Pages 543-547 |
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