Application of Integrable Systems to Phase Transitions (eBook)
X, 219 Seiten
Springer Berlin (Verlag)
978-3-642-38565-0 (ISBN)
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.
The author obtained his Ph.D in mathematics at University of Pittsburgh in 1998. Then he worked at University of California, Davis, as a visiting research assistant professor for one year before he started working in industry. The Marcenko-Pastur distribution in econophysics inspired him to search a unified model for the eigenvalue densities in the matrix models. The phase transition models discussed in this book are based on the Gross-Witten third-order phase transition model and the researches on transition problems in complex systems and data clustering. He is now a data scientist at Institute of Analysis, MI, USA. Email: chiebingwang@yahoo.com
The author obtained his Ph.D in mathematics at University of Pittsburgh in 1998. Then he worked at University of California, Davis, as a visiting research assistant professor for one year before he started working in industry. The Marcenko-Pastur distribution in econophysics inspired him to search a unified model for the eigenvalue densities in the matrix models. The phase transition models discussed in this book are based on the Gross-Witten third-order phase transition model and the researches on transition problems in complex systems and data clustering. He is now a data scientist at Institute of Analysis, MI, USA. Email: chiebingwang@yahoo.com
Introduction.- Densities in Hermitian Matrix Models.- Bifurcation Transitions and Expansions.- Large-N Transitions and Critical Phenomena.- Densities in Unitary Matrix Models.- Transitions in the Unitary Matrix Models.- Marcenko-Pastur Distribution and McKay’s Law.
Erscheint lt. Verlag | 20.7.2013 |
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Zusatzinfo | X, 219 p. |
Verlagsort | Berlin |
Sprache | englisch |
Themenwelt | Mathematik / Informatik ► Mathematik |
Naturwissenschaften ► Physik / Astronomie ► Theoretische Physik | |
Technik | |
Schlagworte | integrable system • Large-N asymptotics • Matrix model • phase transition • Planar diagram • Power-law • Seiberg-Witten theory • String equation • Toda lattice • Unified model |
ISBN-10 | 3-642-38565-6 / 3642385656 |
ISBN-13 | 978-3-642-38565-0 / 9783642385650 |
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