|Problems and Solutions in Quantum Chemistry and Physics |
by Charles S. Johnson, Jr., Lee G. Pedersen
Unusually varied problems, with detailed solutions, cover quantum mechanics, wave mechanics, angular momentum, molecular spectroscopy, scattering theory, more. 280 problems, plus 139 supplementary exercises.
|Mathematics for Quantum Chemistry |
by Jay Martin Anderson
Introduction to problems of molecular structure and motion covers calculus of orthogonal functions, algebra of vector spaces, and Lagrangian and Hamiltonian formulation of classical mechanics. Answers to problems. 1966 edition.
|Introduction to the Quantum Theory: Third Edition |
by David Park
Geared toward upper-level undergraduates and graduate students, this self-contained first course in quantum mechanics covers basic theory and selected applications and includes numerous problems of varying difficulty. 1992 edition.
|Quantum Theory |
by David Bohm
This advanced undergraduate-level text presents the quantum theory in terms of qualitative and imaginative concepts, followed by specific applications worked out in mathematical detail.
|Variational Principles in Dynamics and Quantum Theory |
by Wolfgang Yourgrau, Stanley Mandelstam
Historical, theoretical survey with many insights, much hard-to-find material. Covers Hamilton's principle, Hamilton-Jacobi equation, relationship to quantum theory and wave mechanics, and more.
|Applications of Group Theory in Quantum Mechanics |
by M. I. Petrashen, J. L. Trifonov
This advanced text explores the theory of groups and their matrix representations. The main focus rests upon point and space groups, with applications to electronic and vibrational states. 1969 edition.
|Group Theory and Quantum Mechanics |
by Michael Tinkham
Graduate-level text develops group theory relevant to physics and chemistry and illustrates their applications to quantum mechanics, with systematic treatment of quantum theory of atoms, molecules, solids. 1964 edition.
|Lectures on Quantum Mechanics |
by Paul A. M. Dirac
Four concise, brilliant lectures on mathematical methods in quantum mechanics from Nobel Prize–winning quantum pioneer build on idea of visualizing quantum theory through the use of classical mechanics.
|Linear Operators for Quantum Mechanics |
by Thomas F. Jordan
Suitable for advanced undergraduates and graduate students, this compact treatment examines linear space, functionals, and operators; diagonalizing operators; operator algebras; and equations of motion. 1969 edition.
|Mathematical Foundations of Quantum Mechanics |
by George W. Mackey
This graduate-level text introduces fundamentals of classical mechanics; surveys basics of quantum mechanics; and concludes with a look at group theory and quantum mechanics of the atom. 1963 edition.
|The Mathematical Principles of Quantum Mechanics |
by Derek F. Lawden
Focusing on the principles of quantum mechanics, this text for upper-level undergraduates and graduate students introduces and resolves special physical problems with more than 100 exercises. 1967 edition.
|Philosophic Foundations of Quantum Mechanics |
by Hans Reichenbach
Noted philosopher offers a philosophical interpretation of quantum physics that reviews the basics of quantum mechanics and outlines their mathematical methods, blending philosophical ideas and mathematical formulations to develop a variety of concrete interpretations. 1944 edition.
|Primer of Quantum Mechanics |
by Marvin Chester
Introductory text builds the mathematical machinery of quantum theory in Dirac Notation directly from the philosophical world view embedded in quantum mechanics. 1992 edition.
|Problems in Quantum Mechanics |
by Harold Gersch, V.I. Kogan, V.M. Galitskiy
Written by a pair of distinguished Soviet mathematicians, this compilation presents 160 lucidly expressed problems in quantum mechanics plus completely worked-out solutions. A masterful supplement to advanced undergraduate and graduate courses. 1963 edition.
|Problems in Quantum Mechanics |
by I. I. Gol’dman, V. D. Krivchenkov
A comprehensive collection of problems of varying degrees of difficulty in nonrelativistic quantum mechanics, with answers and completely worked-out solutions. An ideal adjunct to any textbook in quantum mechanics.
|Quantum Mechanics: Principles and Formalism |
by Roy McWeeny
Focusing on main principles of quantum mechanics and their immediate consequences, this graduate student-oriented volume develops the subject as a fundamental discipline, opening with review of origins of Schrödinger's equations and vector spaces.
|Quantum Mechanics and Path Integrals: Emended Edition |
by Richard P. Feynman, Albert R. Hibbs, Daniel F. Styer
The Nobel Prize–winning physicist presents unique insights into his theory and its applications. Feynman starts with fundamentals and advances to the perturbation method, quantum electrodynamics, and statistical mechanics. 1965 edition, emended in 2005.
|Quantum Mechanics in Simple Matrix Form |
by Thomas F. Jordan
With this text, basic quantum mechanics becomes accessible to undergraduates with no background in mathematics beyond algebra. Includes more than 100 problems and 38 figures. 1986 edition.
|Stochastic Methods in Quantum Mechanics |
by Stanley P. Gudder
This introductory survey of stochastic methods and techniques in quantum physics, functional analysis, probability theory, communications, and electrical engineering also serves as a useful and comprehensive reference volume. 1979 edition.