Introduction to Vectors and Tensors Second Edition--Two Volumes Bound as One
by Bowen, Ray M.; Wang, C.-C.Edition: 2nd
Format: Paperback
Pub. Date: 2009-01-15
Publisher(s): Dover Publications
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Summary
This convenient single-volume compilation of two texts offers both an introduction and an in-depth survey. Geared toward engineering and science students rather than mathematicians, its less rigorous treatment focuses on physics and engineering applications. A practical reference for professionals, it is suitable for advanced undergraduate and graduate students. 1976 edition.
Author Biography
Ray M. Bowen earned his Ph.D. in mechanical engineering from Texas A&M University and later served as president there. He is currently president emeritus with a faculty appointment in mechanical engineering.
Table of Contents
| Linear and Multilinear Algebra | |
| Contents of Volume 2 | p. vii |
| Basic Mathematics | |
| Selected Readings for Part I | p. 2 |
| Elementary Matrix Theory | p. 3 |
| Sets, Relations, and Functions | p. 13 |
| Sets and Set Algebra | p. 13 |
| Ordered Pairs" Cartesian Products" and Relations | p. 16 |
| Functions | p. 18 |
| Groups, Rings and Fields | p. 23 |
| The Axioms for a Group | p. 23 |
| Properties of a Group | p. 26 |
| Group Homomorphisms | p. 29 |
| Rings and Fields | p. 33 |
| Vector and Tensor Algebra | |
| Selected Readings for Part II | p. 40 |
| Vector Spaces | p. 41 |
| The Axioms for a Vector Space | p. 41 |
| Linear Independence, Dimension and Basis | p. 46 |
| Intersection, Sum and Direct Sum of Subspaces | p. 55 |
| Factor Spaces | p. 60 |
| Inner Product Spaces | p. 63 |
| Orthogonal Bases and Orthogonal Compliments | p. 70 |
| Reciprocal Basis and Change of Basis | p. 76 |
| Linear Transformations | p. 85 |
| Definition of a Linear Transformation | p. 85 |
| Sums and Products of Linear Transformations | p. 93 |
| Special Types of Linear Transformations | p. 97 |
| The Adjoint of a Linear Transformation | p. 105 |
| Component Formulas | p. 118 |
| Determinants and Matrices | p. 125 |
| The Generalized Kronecker Deltas and the Summation Convention | p. 125 |
| Determinants | p. 130 |
| The Matrix of a Linear Transformation | p. 136 |
| Solution of Systems of Linear Equations | p. 142 |
| Spectral Decompositions | p. 145 |
| Direct Sum of Endomorphisms | p. 145 |
| Eigenvectors and Eigenvalues | p. 148 |
| The Characteristic Polynomial | p. 151 |
| Spectral Decomposition for Hermitian Endomorphisms | p. 158 |
| Illustrative Examples | p. 171 |
| The Minimal Polynomial | p. 176 |
| Spectral Decomposition for Arbitrary Endomorphisms | p. 182 |
| Tensor Algebra | p. 203 |
| Linear Functions, the Dual Space | p. 203 |
| The Second Dual Space, Canonical Isomorphisms | p. 213 |
| Multilinear Functions, Tensors | p. 218 |
| Contractions | p. 229 |
| Tensors on Inner Product Spaces | p. 235 |
| Exterior Algebra | p. 247 |
| Skew-Symmetric Tensors and Symmetric Tensors | p. 247 |
| The Skew-Symmetric Operator | p. 250 |
| The Wedge Product | p. 256 |
| Product Bases and Strict Components | p. 263 |
| Determinants and Orientations | p. 271 |
| Duality | p. 280 |
| Transformation to Contravariant Representation | p. 287 |
| Index | p. ix |
| Vector and Tensor Analysis | |
| Vector and Tensor Analysis | |
| Selected Readings for Part III | p. 296 |
| Euclidean Manifolds | p. 297 |
| Euclidean Point Spaces | p. 297 |
| Coordinate Systems | p. 306 |
| Transformation Rules for Vector and Tensor Fields | p. 324 |
| Anholonomic and Physical Components of Tensors | p. 332 |
| Christoffel Symbols and Covariant Differentiation | p. 339 |
| Covariant Derivatives along Curves | p. 353 |
| Vector Fields and Differential Forms | p. 359 |
| Lie Derivatives | p. 359 |
| Frobenius Theorem | p. 368 |
| Differential Forms and Exterior Derivative | p. 373 |
| The Dual Form of Frobenius Theorem: the Poincare Lemma | p. 381 |
| Vector Fields in a Three-Dimensional Euclidean Manifold, I. Invariants and Intrinsic Equations | p. 389 |
| Vector Fields in a Three-Dimensional Euclidean Manifold, II. Representations for Special Class of Vector Fields | p. 399 |
| Hypersurfaces in a Euclidean Manifold | |
| Normal Vector, Tangent Plane, and Surface Metric | p. 407 |
| Surface Covariant Derivatives | p. 416 |
| Surface Geodesics and the Exponential Map | p. 425 |
| Surface Curvature, I. The Formulas of Weingarten and Gauss | p. 433 |
| Surface Curvature, II. The Riemann-Christoffel Tensor and the Ricci Identities | p. 443 |
| Surface Curvature, III. The Equations of Gauss and Codazzi | p. 449 |
| Surface Area, Minimal Surface | p. 454 |
| Surfaces in a Three-Dimensional Euclidean Manifold | p. 457 |
| Elements of Classical Continuous Groups | |
| The General Linear Group and Its Subgroups | p. 463 |
| The Parallelism of Cartan | p. 469 |
| One-Parameter Groups and the Exponential Map | p. 476 |
| Subgroups and Subalgebras | p. 482 |
| Maximal Abelian Subgroups and Subalgebras | p. 486 |
| Integration of Fields on Euclidean Manifolds, Hypersurfaces, and Continuous Groups | |
| Are Length, Surface Area, and Volume | p. 491 |
| Integration of Vector Fields and Tensor Fields | p. 499 |
| Integration of Differential Forms | p. 503 |
| Generalized Stokes' Theorem | p. 507 |
| Invariant Integrals on Continuous Groups | p. 515 |
| Index | p. vii |
| Table of Contents provided by Ingram. All Rights Reserved. |
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