Statistical mechanics of disordered systems : a mathematical perspective

This self-contained book is a graduate-level introduction for mathematicians and for physicists interested in the mathematical foundations of the field, and can be used as a textbook for a two-semester course on mathematical statistical mechanics. It assumes only basic knowledge of classical physics and, on the mathematics side, a good working knowledge of graduate-level probability theory. The book starts with a concise introduction to statistical mechanics, proceeds to disordered lattice spin systems, and concludes with a presentation of the latest developments in the mathematical understanding of mean-field spin glass models. In particular, progress towards a rigorous understanding of the replica symmetry-breaking solutions of the Sherrington-Kirkpatrick spin glass models, due to Guerra, Aizenman-Sims-Starr and Talagrand, is reviewed in some detail.

• Preface
• Part I. Statistical Mechanics: 1. Introduction
• 2. Principles of statistical mechanics
• 3. Lattice gases and spin systems
• 4. Gibbsian formalism
• 5. Cluster expansions
• Part II. Disordered Systems: Lattice Models: 6. Gibbsian formalism and metastates
• 7. The random field Ising model
• Part III: Disordered Systems: Mean Field Models: 8. Disordered mean field models
• 9. The random energy model
• 10. Derrida's generalised random energy models
• 11. The SK models and the Parisi solution
• 12. Hopfield models
• 13. The number partitioning problem
• Bibliography
• Index of notation
• Index.