Listing 1 - 3 of 3 |
Sort by
|
Choose an application
The notion of renormalization is at the core of several spectacular achievements of contemporary physics. This book provides an introduction to the sophisticated tools used in the theory of non-perturbative renormalization, allowing a unified and rigorous treatment of Quantum Field Theory, Statistical Physics and Condensed Matter models.
Renormalization (Physics) --- Quantum field theory. --- Relativistic quantum field theory --- Field theory (Physics) --- Quantum theory --- Relativity (Physics) --- Charge and mass renormalization --- Mass and charge renormalization --- Electric charge and distribution --- Mass (Physics) --- Physical measurements --- Quantum field theory
Choose an application
The Luttinger Model is the only model of many-fermion physics with legitimate claims to be both exactly and completely solvable. In several respects it plays the same role in many-body theory as does the 2D Ising model in statistical physics. Interest in the Luttinger model has increased steadily ever since its introduction half a century ago. The present volume starts with reprints of the seminal papers in which it was originally introduced and solved, and continues with several contributions setting out the landscape of the principal advances of the last fifty years and of prominent new dire
Condensed matter --- Condensed materials --- Condensed media --- Condensed phase --- Materials, Condensed --- Media, Condensed --- Phase, Condensed --- Liquids --- Matter --- Solids --- Research. --- Luttinger liquids.
Choose an application
The book is based on the lectures given at the CIME school "Quantum many body systems" held in the summer of 2010. It provides a tutorial introduction to recent advances in the mathematics of interacting systems, written by four leading experts in the field: V. Rivasseau illustrates the applications of constructive Quantum Field Theory to 2D interacting electrons and their relation to quantum gravity; R. Seiringer describes a proof of Bose-Einstein condensation in the Gross-Pitaevski limit and explains the effects of rotating traps and the emergence of lattices of quantized vortices; J.-P. Solovej gives an introduction to the theory of quantum Coulomb systems and to the functional analytic methods used to prove their thermodynamic stability; finally, T. Spencer explains the supersymmetric approach to Anderson localization and its relation to the theory of random matrices. All the lectures are characterized by their mathematical rigor combined with physical insights.
Many-body problem --- Civil & Environmental Engineering --- Physics --- Engineering & Applied Sciences --- Physical Sciences & Mathematics --- Atomic Physics --- Applied Physics --- Operations Research --- Many-body problem. --- Mathematics. --- n-body problem --- Problem of many bodies --- Problem of n-bodies --- Math --- Mathematical physics. --- Phase transformations (Statistical physics). --- Condensed materials. --- Condensed matter. --- Superconductivity. --- Superconductors. --- Mathematical Physics. --- Quantum Gases and Condensates. --- Strongly Correlated Systems, Superconductivity. --- Science --- Mechanics, Analytic --- Superconducting materials --- Superconductive devices --- Cryoelectronics --- Electronics --- Solid state electronics --- Electric conductivity --- Critical currents --- Superfluidity --- Condensed materials --- Condensed media --- Condensed phase --- Materials, Condensed --- Media, Condensed --- Phase, Condensed --- Liquids --- Matter --- Solids --- Phase changes (Statistical physics) --- Phase transitions (Statistical physics) --- Phase rule and equilibrium --- Statistical physics --- Physical mathematics --- Materials --- Mathematics --- Vielteilchentheorie. --- Cetraro <2010> --- Quantum statistics. --- Quantum statistical mechanics --- Matrix mechanics --- Statistical mechanics --- Wave mechanics
Listing 1 - 3 of 3 |
Sort by
|