6 edition of **Functional Integrals in Quantum Field Theory and Statistical Physics (Mathematical Physics and Applied Mathematics)** found in the catalog.

- 68 Want to read
- 7 Currently reading

Published
**December 31, 1899**
by Springer
.

Written in English

- Mathematics for scientists & engineers,
- Science/Mathematics,
- Quantum Statistics,
- Science,
- Statistical physics,
- Mathematical Analysis,
- Mathematical Physics,
- Waves & Wave Mechanics,
- Mathematics-Mathematical Analysis,
- Science / Mathematical Physics,
- Science / Waves & Wave Mechanics,
- Science-Mathematical Physics,
- Integration, Functional,
- Quantum field theory

**Edition Notes**

Contributions | J. Niederle (Translator), L. Hlavatý (Translator) |

The Physical Object | |
---|---|

Format | Hardcover |

Number of Pages | 312 |

ID Numbers | |

Open Library | OL9096054M |

ISBN 10 | 9027714711 |

ISBN 10 | 9789027714718 |

This book adopts a more general point of view and includes applications of condensed matter physics. Written by a highly respected writer and researcher, it first develops traditional concepts, including Feynman graphs, before moving on to key topics such as functional integrals, statistical mechanics, and Wilson's renormalization group. physics; a chapter on critical phenomena in non-magnetic systems, polymers, liquid-vapour, and helium superfluid transitions; and a chaper on finite temperature relativistic quantum field theory. The book can be roughly divided into four parts: chapters deal with general field theory, functional integrals, and functional methods/5(3).

However, it is the only one of this set to touch on the subject of functional integrals. Further references: The Theory of Quantum Liquids by D. Pines and P. Nozieres. Excellent introduction to Fermi liquid theory that avoids the use of field theory. Statistical Physics, vol II by Lifshitz and Pitaevskii. Pergammon. The effective action is a functional of the field and is defined through a Legendre transformation of the generating function for connected Green's functions. Its introduction is similar in spirit to the introduction of the internal energy and its relation to the free energy in statistical mechanics, with playing.

1 A Brief History of Quantum Field Theory Quantum ﬂeld theory (QFT) is a subject which has evolved considerably over the years and continues to do so. From its beginnings in elementary particle physics it has found applications in many other branches of science, in particular condensed matter physics but also as far aﬂeld as biology and File Size: KB. A unique approach to quantum field theory, with emphasis on the principles of renormalization Quantum field theory is frequently approached from the perspective of particle physics. This book adopts a more general point of view and includes applications of condensed matter physics. Written by a highly respected writer and researcher, it first develops traditional concepts, including .

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The application of the functional integration methods to systems with an infinite number of degrees of freedom allows one to uniquely introduce and formulate the diagram perturbation theory in quantum field theory and statistical physics.

This approach is significantly simpler than the widely accepted method using an operator approach. The application of the functional integration methods to systems with an infinite number of degrees of freedom allows one to uniquely introduce and formulate the diagram perturbation theory in quantum field theory and statistical physics.

This approach is significantly simpler than the widely accepted method using an operator by: 3. Quantization of Systems with Constraints.- 4. Functional Integrals and Quantization on Manifolds.- 2. Functional Integrals in Quantum Field Theory and Statistical Physics.- 5.

Functional Integrals and Perturbation Theory in Quantum Field Theory.- 6. Functional Integrals and the Temperature Diagram Technique in Statistical Physics.- 3.

Gauge. Quantum Field Theory By Eric D Hoker. This note covers the following topics:Quantum Mechanics, Principles of Relativistic Quantum Field Theory, Free Field Theory, Interacting Field Theories – Gauge Theories, The S-matrix and LSZ Reduction formulas, Functional Methods in Scalar Field Theory, Perturbative Renormalization, Functional Integrals for Fermi Fields, Quantum Electrodynamics, 2 QED.

Functional Integrals in Quantum Field Theory and Statistical Physics | V. Popov, J. Niederle | download | B–OK. Download books for free. Find books. Buy Functional Integrals in Quantum Field Theory and Statistical Physics (Mathematical Physics and Applied Mathematics) on FREE SHIPPING on qualified orders Functional Integrals in Quantum Field Theory and Statistical Physics (Mathematical Physics and Applied Mathematics): V.N.

Popov, J. Niederle, L. Hlavatý: Amazon Cited by: Find many great new & used options and get the best deals for Mathematical Physics and Applied Mathematics: Functional Integrals in Quantum Field Theory and Statistical Physics 8 by V. Popov (, Hardcover) at the best online prices at eBay.

Free shipping for many products. Functional integrals and quantum mechanics --Functional integrals in quantum field theory and statistical physics --Gauge fields --Infrared asymptotics of Green's functions --Scattering of high energy particles --Superfluidity --Superconductivity --Plasma theory --The Ising model --Phase transitions --Vortex-like excitations in relativistic.

Path Integrals in Physics: Volume II, Quantum Field Theory, Statistical Physics and other Modern Applications covers the fundamentals of path integrals, both the Wiener and Feynman types, and their many applications in physics.

The book deals with systems that have an. Functional integrals in quantum field theory and statistical physics V. Popov: D. Reidel, Dordrecht, Acta Applicandae Mathematica volume 5, pages 95 – 96 () Cite this article.

A unique approach to quantum field theory, with emphasis on the principles of renormalization Quantum field theory is frequently approached from the perspective of particle physics.

This book adopts a more general point of view and includes applications of condensed matter physics. Written by a highly respected writer and researcher, it first develops traditional concepts, including Feynman.

The book by Zee, Quantum Field Theory in a Nutshell, is good for someone with background on gravity and condense matter, but will mess up the beginner's mind with bombarding of variety of topic. I personally suggest, Ashok Das, Ryder, and Mandel & Shaw.

The successes of the theory of collective states of multiparticle systems in the last three decades are due to a considerable extent to the employment of the methods of quantum field theory in statistical physics. We recall in the first instance the Green’s function technique of quantum : V.

Popov, V. Yarunin. Common integrals in quantum field theory are all variations and generalizations of Gaussian integrals to the complex plane and to multiple dimensions. Other integrals can be approximated by versions of the Gaussian integral.

Fourier integrals are also considered. Hamiltonians in quantum mechanics can be expressed in terms of creation and annihilation operators, instead of the more usual position and momentum operators, a method well adapted to the study of perturbed harmonic oscillators.

In the holomorphic formalism these operators act by multiplication and differentiation on a vector space of analytic functions. ( views) Quantum Field Theory and Functional Integrals by Nima Moshayedi -We describe Feynman's path integral approach to quantum mechanics and quantum field theory from a functional integral point of view, where focus lies in Euclidean field theory.

Gaussian measure and the construction of the Wiener measure are covered. Feynman Path Integrals in Quantum Mechanics. Introduction to Functional Integration: Stiff Polymer Chains.

The Excluded Volume Problem: The Self‐Consistent Field. Polymers in Bulk: Introduction. Is There a Polymer Analog of the Perfect Gas. Statistical Mechanics with Constraints: Introduction. Polymers in Bulk: A Field TheoryCited by: This book provides a self-consistent and accessible introduction to the sophisticated tools used in the modern theory of non-perturbative renormalization, allowing an unified and rigorous treatment of Quantum Field Theory, Statistical Physics and Condensed Matter models.

I'm reading Quantum Field Theory and Critical Phenomena, 4th ed., by Zinn-Justin and on page I came across the statement that the functional integral of a functional derivative is zero, i.e. Functional integration is a collection of results in mathematics and physics where the domain of an integral is no longer a region of space, but a space of onal integrals arise in probability, in the study of partial differential equations, and in the path integral approach to the quantum mechanics of particles and fields.

In an ordinary integral (in the sense of Lebesgue. Quantum Field Theory is an exceptional textbook for graduate students familiar with advanced quantum mechanics as well as physicists with an interest in theoretical physics.

It features: * Coverage of quantum electrodynamics with practical calculations and a discussion of perturbative renormalization * A discussion of the Feynman path integrals /5(9).researcher, this book has a more general scope and adopts a more practical approach than other books.

It includes applications of condensed matter physics, first developing traditional concepts, including Feynman graphs, before moving on to such key topics as functional integrals, statistical mechanics and Wilsons renormalization group.

The author.It includes applications of condensed matter physics, first developing traditional concepts, including Feynman graphs, before moving on to such key topics as functional integrals, statistical mechanics and Wilson's renormalization group.

The author takes care to explain the connection between the latter and conventional perturbative.