Statistical Mechanics
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統計力学:大学院入門コース An Introductory Graduate Course, 1st ed. 2019 Series: Graduate Texts in Physics Author: Berlinsky, A. J. / Harris, A. B. Publisher: Springer ISBN: 9783030281861 Cover: HARDCOVER Date: 2019年10月 DESCRIPTION In a comprehensive treatment of Statistical Mechanics from thermodynamics through the renormalization group, this book serves as the core text for a full-year graduate course in statistical mechanics at either the Masters or Ph.D. level. Each chapter contains numerous exercises, and several chapters treat special topics which can be used as the basis for student projects. The concept of scaling is introduced early and used extensively throughout the text. At the heart of the book is an extensive treatment of mean field theory, from the simplest decoupling approach, through the density matrix formalism, to self-consistent classical and quantum field theory as well as exact solutions on the Cayley tree. Proceeding beyond mean field theory, the book discusses exact mappings involving Potts models, percolation, self-avoiding walks and quenched randomness, connecting various athermal and thermal models. Computational methods such as series expansions and Monte Carlo simulations are discussed, along with exact solutions to the 1D quantum and 2D classical Ising models. The renormalization group formalism is developed, starting from real-space RG and proceeding through a detailed treatment of Wilson’s epsilon expansion. Finally the subject of Kosterlitz-Thouless systems is introduced from a historical perspective and then treated by methods due to Anderson, Kosterlitz, Thouless and Young. Altogether, this comprehensive, up-to-date, and engaging text offers an ideal package for advanced undergraduate or graduate courses or for use in self study. TABLE OF CONTENTS I Preliminaries.- Introduction.- Phase Diagrams.- Thermodynamic Properties andRelations.- II Basic Formalism.- Basic Principles.- Examples.- Basic Principles(Continued).- Noninteracting Gases.- III Mean Field Theory, Landau Theory.-Mean-Field Approximation for the Free Energy.- Density Matrix Mean-Field Theoryand Landau Expansions.- Landau Theory for Two or More Order Parameters.- QuantumFluids.- Theory of Superconductivity.- Qualitative Discussion of Fluctuations.-The Cayley Tree.- IV Beyond Mean Field Theory.- Exact Mappings.- SeriesExpansions.- The Ising Model: Exact Solutions.- Monte Carlo.- Real SpaceRenormalization Group.- The Epsilon Expansion.- Kosterlitz-Thouless Physics.
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