Book contents
- Frontmatter
- Dedication
- Contents
- Preface
- Introduction
- 1 Scales and complexity
- 2 Quantum fields
- 3 Conserved particles
- 4 Simple examples of second quantization
- 5 Green's functions
- 6 Landau Fermi-liquid theory
- 7 Zero-temperature Feynman diagrams
- 8 Finite-temperature many-body physics
- 9 Fluctuation–dissipation theorem and linear response theory
- 10 Electron transport theory
- 11 Phase transitions and broken symmetry
- 12 Path integrals
- 13 Path integrals and itinerant magnetism
- 14 Superconductivity and BCS theory
- 15 Retardation and anisotropic pairing
- 16 Local moments and the Kondo effect
- 17 Heavy electrons
- 18 Mixed valence, fluctuations, and topology
- Epilogue: the challenge of the future
- Author Index
- Subject Index
- References
11 - Phase transitions and broken symmetry
Published online by Cambridge University Press: 05 December 2015
Book contents
- Frontmatter
- Dedication
- Contents
- Preface
- Introduction
- 1 Scales and complexity
- 2 Quantum fields
- 3 Conserved particles
- 4 Simple examples of second quantization
- 5 Green's functions
- 6 Landau Fermi-liquid theory
- 7 Zero-temperature Feynman diagrams
- 8 Finite-temperature many-body physics
- 9 Fluctuation–dissipation theorem and linear response theory
- 10 Electron transport theory
- 11 Phase transitions and broken symmetry
- 12 Path integrals
- 13 Path integrals and itinerant magnetism
- 14 Superconductivity and BCS theory
- 15 Retardation and anisotropic pairing
- 16 Local moments and the Kondo effect
- 17 Heavy electrons
- 18 Mixed valence, fluctuations, and topology
- Epilogue: the challenge of the future
- Author Index
- Subject Index
- References
Summary
A summary is not available for this content so a preview has been provided. Please use the Get access link above for information on how to access this content.
- Type
- Chapter
- Information
- Introduction to Many-Body Physics , pp. 357 - 415Publisher: Cambridge University PressPrint publication year: 2015
References
[1] , Theory of phase transformations, Phys. Z. Sowjetunion, vol. 11, no. 26, p. 545, 1937.Google Scholar
[3] , Lectures on Phase Transitions and the Renormalization Group, Perseus Publishing, 1992.
[4] and , Accidental deviations of density and opalescence at the critical point of a single substance, Proc. Sect. Sci. K. Akad. Wet. Amsterdam, vol. 17, p. 793, 1914.Google Scholar
[5] and , On the theory of superconductivity. Zh. Eksp. Teor. Fiz, vol. 20, p. 1064, 1950.Google Scholar
[6] , Type II superconductors and the vortex lattice, Les Prix Nobel, Nobel Foundation, p. 59, 2003.Google Scholar
[8] and , Bose–Einstein condensation and liquid helium, Phys. Rev., vol. 104, p. 576, 1956.Google Scholar
[9] , Considerations on the flow of superfluid helium, Rev. Mod. Phys., vol. 38, p. 298, 1966.Google Scholar
[10] , Concept of off-diagonal long-range order and the quantum phases of liquid he and of superconductors. Rev. Mod. Phys., vol. 34, p. 694, 1962.Google Scholar
[12] , Progress in Low Temperature Physics, vol. 1 North Holland, 1955.
[13] , Superfluids, Dover Publications, vols. 1–2, 1961–1964.
[14] and , Type II Superconductivity, Pergamon Press, 1969.
[15] , Proceedings of the International Conference on Theoretical Physics, Kyoto and Tokyo, September 1953, Science Council of Japan, p. 935, 1954.
[16] and , Experimental evidence for quantized flux in superconducting cylinders. Phys. Rev. Lett., vol. 7, p. 43, 1961.Google Scholar
[17] and , Experimental proof of magnetic flux quantization in a superconducting ring, Phys. Rev. Lett., vol. 7, p. 51, 1961.Google Scholar
[18] , Plasmons, gauge invariance, and mass, Phys. Rev., vol. 130, no. 1, p. 439, 1963.Google Scholar
[19] , Broken symmetries and the masses of gauge bosons, Phys. Rev. Lett., vol. 13, no. 16, p. 508, 1964.Google Scholar
[20] , Random-phase approximation in the theory of superconductivity, Phys. Rev., vol. 112, no. 6, p. 1900, 1958.Google Scholar
[21] , Partial symmetries of weak interactions, Nucl. Phys., vol. 22, no. 4, p. 579, 1961.Google Scholar
[23] and , Higgs boson theory and phenomenology, Prog. Part. Nucl. Phys., vol. 50, p. 63, 2003.Google Scholar
[25] , Basic Notions of Condensed Matter Physics, Benjamin Cummings, 1984.
[27] , Contribution to the theory of light scattering near the second-order phase transition points, J. Exp. Theor. Phys. vol. 36, p. 571, 1959.Google Scholar
[28] , Some remarks on phase transitions of the second kind and the microscopic theory of ferroelectrics, J. Exp. Theor. Phys., vol. 2, p. 1824, 1960.Google Scholar