Algebraically based approach to vectors, mapping, diffraction, and other topics in applied math also covers generalized functions, analytic function theory, and more. Additional topics include sections on linear algebra, Hilbert spaces, calculus of variations, boundary value problems, integral equati... read more
Principles and Techniques of Applied Mathematics by Bernard Friedman Stimulating study of how abstract methods of pure mathematics can solve problems in applied math. Solving integral equations, finding Green’s function, spectral representation of ordinary differential operators, more. Problems. Bibliography.
Lectures on Gas Theory by Ludwig Boltzmann A masterpiece of theoretical physics, this classic contains a comprehensive exposition of the kinetic theory of gases. It combines rigorous mathematic analysis with a pragmatic treatment of physical and chemical applications.
Dynamics of Physical Systems by Dr. Robert H., Jr. Cannon Comprehensive text and reference covers modeling of physical systems in several media, derivation of differential equations of motion and related physical behavior, dynamic stability and natural behavior, more. 1967 edition.
Advanced Mathematics for Engineers and Scientists by Paul DuChateau This primary text and supplemental reference focuses on linear algebra, calculus, and ordinary differential equations. Additional topics include partial differential equations and approximation methods. Includes solved problems. 1992 edition.
Generalized Functions and Partial Differential Equations by Avner Friedman This self-contained text details developments in the theory of generalized functions and the theory of distributions, and it systematically applies them to a variety of problems in partial differential equations. 1963 edition.
Capsule Calculus by Ira Ritow This text explores calculus from the engineering viewpoint: differential, integral, and time calculus; equations of motion and their solution; complex variables, algebra, and functions; complex and operational calculus; more. 1962 edition.
A Survey of Industrial Mathematics by Charles R. MacCluer Students learn how to solve problems they'll encounter in their professional lives with this concise single-volume treatment. It employs MATLAB and other strategies to explore typical industrial problems. 2000 edition.
Elements of Pure and Applied Mathematics by Harry Lass This completely self-contained survey explores important topics in pure and applied mathematics. Each chapter can be read independently, and all are unified by cross-references to the complete work. 1957 edition.
How to Solve Applied Mathematics Problems by B. L. Moiseiwitsch This workbook bridges the gap between lectures and practical applications, offering students of mathematics, engineering, and physics the chance to practice solving problems from a wide variety of fields. 2011 edition.
Methods of Applied Mathematics by Francis B. Hildebrand Offering a number of mathematical facts and techniques not commonly treated in courses in advanced calculus, this book explores linear algebraic equations, quadratic and Hermitian forms, the calculus of variations, more.
Worked Problems in Applied Mathematics by N. N. Lebedev, Richard A. Silverman These 566 problems plus answers cover a wide range of topics in an accessible manner, including steady-state harmonic oscillations, Fourier method, integral transforms, curvilinear coordinates, integral equations, and more. 1965 edition.
A Collection of Problems in Mathematical Physics by B. M Budak, A. Samarskii, A. N. Tikhonov Outstanding, wide-ranging material on classification and reduction to canonical form of second-order differential equations; hyperbolic, parabolic, elliptic equations, more. Bibliography.
Equations of Mathematical Physics by A. N. Tikhonov, A. A. Samarskii Thorough, rigorous advanced-undergraduate to graduate-level treatment of problems leading to partial differential equations. Hyperbolic, parabolic, elliptic equations; wave propagation in space, heat conduction in space, more. Problems. Appendixes.
Fundamentals of Mathematical Physics by Edgar A. Kraut Indispensable for students of modern physics, this text provides the necessary background in mathematics to study the concepts of electromagnetic theory and quantum mechanics. 1967 edition.
Mathematical Physics by Donald H. Menzel Useful treatment of classical mechanics, electromagnetic theory, and relativity includes explanations of function theory, vectors, matrices, dyadics, tensors, partial differential equations, other advanced mathematical techniques. Nearly 200 problems with answers.
Mathematical Physics: A Popular Introduction by Francis Bitter Reader-friendly guide offers illustrative examples of the rules of physical science and how they were formulated. Direct, nontechnical terms explain methods of fact gathering, analysis, and experimentation. 60 figures. 1963 edition.
Partial Differential Equations of Mathematical Physics by S. L. Sobolev Unusually accessible introduction to equations used to investigate many physical problems. Detailed, precise coverage of Riemann method, Lebesgue integration, Green's function, many other topics. Only knowledge of elementary analysis required. 1964 edition.
Algebraically based approach to vectors, mapping, diffraction, and other topics in applied math also covers generalized functions, analytic function theory, and more. Additional topics include sections on linear algebra, Hilbert spaces, calculus of variations, boundary value problems, integral equations, analytic function theory, and integral transform methods. Exercises. 1969 edition.
Reprint of McGraw-Hill Book Company, New York, 1969 edition.
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