Application of Integrable Systems to Phase Transitions

 

English | 2013-07-30 | 222 pages | PDF | 2.1 Mb


The eigenvalue densities in various matrix models in quantum chromodynamics (QCD) are ultimately unified in this book by a unified model derived from the integrable systems. Many new density models and free energy functions are consequently solved and presented. The phase transition models including critical phenomena with fractional power-law for the discontinuities of the free energies in the matrix models are systematically classified by means of a clear and rigorous mathematical demonstration. The methods here will stimulate new research directions such as the important Seiberg-Witten differential in Seiberg-Witten theory for solving the mass gap problem in quantum Yang-Mills theory. The formulations and results will benefit researchers and students in the fields of phase transitions, integrable systems, matrix models and Seiberg-Witten theory.

Download:

http://longfiles.com/a042i7ebi6qj/3642385648.pdf.html

http://onmirror.com/vpkgwnv1pcg8/3642385648.pdf.html

[Fast Download] Application of Integrable Systems to Phase Transitions


Ebooks related to "Application of Integrable Systems to Phase Transitions" :
Electromagnetic Interactions
Lev D. Landau, Evgenij M. Lifsits, Fisica teorica VI. Meccanica dei fluidi
Advanced Methods of Continuum Mechanics for Materials and Structures
The Finite Element Analysis Program MSC Marc/Mentat: A First Introduction
Exploring Greenland: Cold War Science and Technology on Ice
Simple Models of Magnetism
Alex Poznyak, "Advanced Mathematical Tools for Automatic Control Engineers: Volume 2: Stochastic Sys
Microworlds: Unlocking the Secrets of Atoms and Molecules
John Kalivas - Mathematical Analysis of Spectral Orthogonality
The Lucent Library of Science and Technology - Lasers
Copyright Disclaimer:
This site does not store any files on its server. We only index and link to content provided by other sites. Please contact the content providers to delete copyright contents if any and email us, we'll remove relevant links or contents immediately.