Kinetic Theory and Transport Phenomena (Paperback)

Rodrigo Soto

  • 出版商: Oxford University
  • 出版日期: 2016-06-14
  • 售價: $830
  • 貴賓價: 9.8$813
  • 語言: 英文
  • 頁數: 304
  • 裝訂: Paperback
  • ISBN: 0198716060
  • ISBN-13: 9780198716068

下單後立即進貨 (約5~7天)

相關主題

商品描述

Description

One of the questions about which humanity has often wondered is the arrow of time. Why does temporal evolution seem irreversible? That is, we often see objects break into pieces, but we never see them reconstitute spontaneously. This observation was first put into scientific terms by the so-called second law of thermodynamics: entropy never decreases. However, this law does not explain the origin of irreversibly; it only quantifies it. Kinetic theory gives a consistent explanation of irreversibility based on a statistical description of the motion of electrons, atoms, and molecules. The concepts of kinetic theory have been applied to innumerable situations including electronics, the production of particles in the early universe, the dynamics of astrophysical plasmas, quantum gases or the motion of small microorganisms in water, with excellent quantitative agreement. This book presents the fundamentals of kinetic theory, considering classical paradigmatic examples as well as modern applications. It covers the most important systems where kinetic theory is applied, explaining their major features. The text is balanced between exploring the fundamental concepts of kinetic theory (irreversibility, transport processes, separation of time scales, conservations, coarse graining, distribution functions, etc.) and the results and predictions of the theory, where the relevant properties of different systems are computed.

Table of Contents

1: Basic concepts
2: Distribution functions
3: The Lorentz model for the classical transport of charges
4: The Boltzmann equation for dilute gases
5: Brownian motion
6: Plasmas and gravitational systems
7: Quantum gases
8: Quantum electronic transport in solids
9: Semiconductors and interband transitions
10: Numerical and semianalytical methods