Synopses & Reviews
A valuable learning tool for students and an indispensable resource for professional scientists and engineers
Several outstanding features make this book a superior introduction to modern statistical mechanics: It is the only intermediate-level text offering comprehensive coverage of both basic statistical mechanics and modern topics such as molecular dynamic methods, renormalization theory, chaos, polymer chain folding, oscillating chemical reactions, and cellular automata. It is also the only text written at this level to address both equilibrium and nonequilibrium statistical mechanics. Finally, students and professionals alike will appreciate such aids to comprehension as detailed derivations for most equations, more than 100 chapter-end exercises, and 15 computer programs written in FORTRAN that illustrate many of the concepts covered in the text.
Statistical Mechanics begins with a refresher course in the essentials of modern statistical mechanics which, on its own, can serve as a handy pocket guide to basic definitions and formulas. Part II is devoted to equilibrium statistical mechanics. Readers will find in-depth coverage of phase transitions, critical phenomena, liquids, molecular dynamics, Monte Carlo techniques, polymers, and more. Part III focuses on nonequilibrium statistical mechanics and progresses in a logical manner from near-equilibrium systems, for which linear responses can be used, to far-from-equilibrium systems requiring nonlinear differential equations.
Synopsis
Statistical Mechanics begins with a refresher course in the essentials of modern statistical mechanics which, on its own, can serve as a handy pocket guide to basic definitions and formulas. Part II is devoted to equilibrium statistical mechanics. Readers will find in-depth coverage of phase transitions, critical phenomena, liquids, molecular dynamics, Monte Carlo techniques, polymers, and more. Part III focuses on nonequilibrium statistical mechanics and progresses in a logical manner from near-equilibrium systems, for which linear responses can be used, to far-from-equilibrium systems requiring nonlinear differential equations.
Synopsis
Dieser Band informiert Sie umfassend und systematisch ber neueste Entwicklungen und aktuelle Methoden auf dem Gebiet der statistischen Mechanik. Sie finden Angaben zum statistischen Gleichgewicht, zur Renormierungstheorie, zu Chaos, Zellularautomaten und verallgemeinerten Langevin-Gleichungen der Nichtgleichgewichts-Statistik sowie zu oszillierenden chemischen Reaktionen. Der Text wird durch Fortran-Quelltexte sowie zahlreiche bungsaufgaben erg nzt. (11/97)
Synopsis
RICHARD E. WILDE, PhD, is a professor emeritus of chemistry at Texas Tech University. He is a member of the American Chemical Society, The Royal Society of Chemistry, the American Physical Society, and a Fellow of AAAS. SURJIT SINGH, PhD, is a research scientist with the SubPicosecond and Quantum Radiation Laboratory at Texas Tech University. He is a member of the American Physical Society and the Indian Physics Association.
Synopsis
Statistical Mechanics reflects the latest techniques and developments in statistical mechanics. Covering a variety of concepts and topics - molecular dynamic methods, renormalization theory, chaos, polymer chain folding, oscillating chemical reactions, and cellular automata. 15 computer programs written in FORTRAN are provided to illustrate the concepts as well as more than 100 chapter-end exercises.
About the Author
"...a course based on the book will expose the richness and beauty of statistical mechanics to the students and...incite their curiosity for further study and research in this fascinating field." (Zentralblatt MATH, Vol. 973, 2001/23)
Table of Contents
ESSENTIALS.
Classical Statistical Mechanics.
Quantum Statistical Mechanics.
EQUILIBRIUM STATISTICAL MECHANICS.
Phase Transitions and Critical Phenomena.
The Liquid State.
Molecular Dynamics Methods.
Monte Carlo Methods.
Polymers, Proteins, and Spin Glass Models.
NONEQUILIBRIUM STATISTICAL MECHANICS.
The Boltzmann Equation.
Approaches to Brownian Motion.
Zwanzig-Mori Formalism.
Activated Barrier-Crossing Problem.
Oscillating Chemical Reactions and Chaos.
Introduction to Cellular Automation Models.
Appendices.
Bibliography.
Indexes.