Mathematical results in statistical mechanics : Marseilles, France, July 27-31, 1998
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Bibliographic Information
Mathematical results in statistical mechanics : Marseilles, France, July 27-31, 1998
World Scientific, c1999
Available at / 13 libraries
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Library, Research Institute for Mathematical Sciences, Kyoto University数研
C-P||Marseilles||1998.799024016
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Includes bibliographies reference
Description and Table of Contents
Description
This invaluable book is a collection of lectures delivered at the Colloquium 'Mathematical Results in Statistical Mechanics' held in Marseilles, France, on July 27-31, 1998, as a satellite colloquium of the Paris conference STATPHYS 20. It covers a large part of the contemporary results in statistical mechanics, from the point of view of mathematical physics, by leading experts in this field. It includes as the main topics, phase transitions, interfaces, disordered systems, Gibbsian and non-Gibbsian states, as well as recent rigorous treatments in quantum statistical mechanics.
Table of Contents
- Exact results for interface structure and wetting
- functional relations for sl(3) Chiral Potts model at q2=-1
- facet shapes in a Wulff Crystal
- macroscopic description of phase separation in the 2D Ising model
- Peierls instability for the Holstein model
- Falicov-Kimball models - a partial review of the ground states problem
- Hubbard model with magnetic field - antiferromagnetism and paramagnetism
- quantum hall effect without divergence of the localization length
- on quantum stochastic dynamics for quantum spin systems on a lattice - low temperature problem
- interface states of quantum spin systems
- thermodynamic behaviour of the Bogoliubov Weakly imperfect Bose gas
- sum rules for Coulomb systems with hard cores
- ground state energy of the low density Bose gas
- universality and scaling in random matrix models and random polynomials
- KAM-renormalization-group for Hamiltonian systems with two degrees of freedom
- on the landscape of attractors in a neural network with interacting patterns
- potentials for one-dimensional restrictions of Gibbs measures. (Part contents)
by "Nielsen BookData"