Listing 1 - 10 of 11 | << page >> |
Sort by
|
Choose an application
Statistical physics --- Quantum mechanics. Quantumfield theory --- Mathematical physics --- Path integrals. --- Polymers. --- Quantum theory. --- Statistical physics.
Choose an application
Statistical physics --- Quantum mechanics. Quantumfield theory --- Mathematical physics --- Quantitative methods (economics) --- Path integrals. --- Quantum theory. --- Statistical physics. --- Polymers. --- Intégrales de chemin --- Théorie quantique --- Physique statistique --- Polymères --- Path integrals --- Quantum theory --- Polymers --- Intégrales de chemin --- Théorie quantique --- Polymères
Choose an application
Integrals, Path --- Polymers --- Quantum theory --- Statistical physics --- Polymères --- Théorie quantique --- Physique statistique --- Path integrals --- Path integrals. --- Polymers. --- Quantum theory. --- Statistical physics. --- Polymères --- Théorie quantique
Choose an application
Superfluidity. --- Phase transformations (Statistical physics) --- Gauge fields (Physics) --- Crystals --- Defects. --- Fields, Gauge (Physics) --- Gage fields (Physics) --- Gauge theories (Physics) --- Lattice defects --- Phase changes (Statistical physics) --- Phase transitions (Statistical physics) --- Condensed degenerate gases --- Degenerate gases, Condensed --- Superfluids --- 530.19 --- 530.19 Fundamental functions in general. Potential. Gradient. Intensity. Capacity etc. --- Fundamental functions in general. Potential. Gradient. Intensity. Capacity etc. --- Superfluidity --- Liquid helium --- Low temperatures --- Quantum statistics --- Superconductivity --- Twinning (Crystallography) --- Field theory (Physics) --- Group theory --- Symmetry (Physics) --- Phase rule and equilibrium --- Statistical physics --- Defects --- Fundamental functions in general. Potential. Gradient. Intensity. Capacity etc --- Crystals - Defects.
Choose an application
This is the fifth, expanded edition of the comprehensive textbook published in 1990 on the theory and applications of path integrals. It is the first book to explicitly solve path integrals of a wide variety of nontrivial quantum-mechanical systems, in particular the hydrogen atom. The solutions have been made possible by two major advances. The first is a new euclidean path integral formula which increases the restricted range of applicability of Feynman's time-sliced formula to include singular attractive 1/r- and 1/r2-potentials. The second is a new nonholonomic mapping principle carrying p
Path integrals. --- Quantum theory. --- Statistical physics. --- Polymers. --- Polymere --- Polymeride --- Polymers and polymerization --- Macromolecules --- Physics --- Mathematical statistics --- Quantum dynamics --- Quantum mechanics --- Quantum physics --- Mechanics --- Thermodynamics --- Integrals, Path --- Integrals --- Probabilities --- Quantum theory --- Statistical physics --- Statistical methods
Choose an application
"This book arose from lectures I gave at the Freie Universität Berlin over the past five decades. They were intended to prepare graduate students for their research in elementary-particle physics or in many-body theory of condensed matter. They should serve as a general introduction and a basis for understanding more advanced work on the subject"--
Choose an application
Path integrals --- Quantum theory --- Statistical physics --- Polymers --- Intégrales de chemin. --- Théorie quantique. --- Physique statistique. --- Polymères.
Choose an application
This volume covers the following fields: path integrals, quantum field theory, variational perturbation theory, phase transitions and critical phenomena, topological defects, strings and membranes, gravitation and cosmology.
Contents:
Path integrals. --- Quantum field theory. --- Relativistic quantum field theory --- Field theory (Physics) --- Quantum theory --- Relativity (Physics) --- Integrals, Path --- Integrals --- Probabilities --- Statistical physics
Choose an application
This work explains in detail how to perform perturbation expansions in quantum field theory to high orders, and how to extract the critical properties of the theory from the resulting divergent power series.
Choose an application
Listing 1 - 10 of 11 | << page >> |
Sort by
|