Quantum Phase Transitions
Lecture (MVSpec)
Tuesday, 11:15-13:00; Thursday, 11:15-13:00; (starting on 18/04) INF 227 (KIP), SR 3.403. [LSF]
Exercises
Tutor: Christian Schmied
Register and view group list here.
Classes take place on Fridays, 14:15-15:45 hrs, starting on 28/04: INF 227 (KIP), SR 1.404.
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Introduction
- Classical phase transitions - phase diagram of water - Ehrenfest classification - continuous phase transitions - quantum phase transitions -
Phase transition in the classical Ising model
- Ising Hamiltonian - Spontaneous symmetry breaking - Thermodynamic properties - Phase transitions in the Ising model - Landau mean-field theory - Mean-field critical exponents - Correlation functions - Hubbard Stratonovich transformation - Functional-integral representation - Ginzburg-Landau-Wilson functional - Saddlepoint approximation and Gaussian effective action - Ginzburg criterion -
Renormalisation-group theory in position space
- Block-spin transformation - Transfer-matrix solution of the 1D Ising chain - RG stepping for the 1D and 2D Ising models - Critical point - RG fixed points - Relevant and irrelevant couplings - Universality and universality class - Renormalisation-group flows - Scaling properties of the free energy and of the two-point correlation function - Scaling relations between critical exponents - The scaling hypothesis -
Wilson's Renormalisation Group
- Perturbation theory - Linked-Cluster and Wick's theorems - Dyson equation - One-loop critical properties - Dimensional analysis - Momentum-scale RG - Gaussian fixed point - Wilson-Fisher fixed point - Epsilon-expansion - Critical exponents - Wave function renormalisation and anomalous dimension - Suppl. Mat.: Asymptotic expansions -
Quantum phase transitions
- Quantum Ising model - Mapping of the classical Ising chain to a quantum spin model - Universal scaling behaviour - Thermal as time-ordered correlators - Quantum to classical mapping - Perturbative spectrum of the transverse-field Ising model - Jordan Wigner transformation and exact spectrum - Universal crossover functions near the quantum critical point - Anomalous scaling dimension - Low-temperature and quantum critical regimes - Conformal mapping - Spectral properties close to criticality - Structure factor, susceptibility, and linear response - Relaxational response in the quantum critical regime
- Quantum Mechanics (PTP 3), Statistical Mechanics (PTP 4); Quantum Field Theory I or Quantum Field Theory of Many-Body Systems
Literature:
Textbooks on critical phenomena and (quantum) phase transitions
- D. Belitz und T.R. Kirkpatrick, in J. Karkheck (Hrsg.), Dynamics: Models and kinetic methods for non-equilibrium many-body systems. Kluwer, Dordrecht (2000). [ Google books | HEIDI ]
- John Cardy, Scaling and renormalization in statistical physics. CUP, Cambridge, 2003. [ Google books | HEIDI ]
- Peter Kopietz, Lorenz Bartosch, Florian Schütz, Introduction to the Functional Renormalization Group. Springer, Berlin Heidelberg, 2010. [ Google books | HEIDI (online) | Errata and Addenda ]
- Lincoln D. Carr (Ed.), Understanding quantum phase transitions. CRC-Press, Boca Raton, 2011. [ Google books | HEIDI ]
- Nigel Goldenfeld, Lectures on phase transitions and the renormalization group. Addison-Wesley, Reading, 1992. [ Google books | HEIDI ]
- Igor Herbut, A modern approach to critical phenomena. CUP, Cambridge, 2007. [ Google books | HEIDI ]
- Subir Sachdev, Quantum Phase Transitions. CUP, Cambridge, 2011. [ Google books | HEIDI (incl. online) ]
- S. L. Sondhi, S. M. Girvin, J. P. Carini, and D. Shahar, Continuous quantum phase transitions. Rev. Mod. Phys. 69, 315 (1997). [ arXiv:cond-mat/9609279 ]
- Jean Zinn-Justin, Quantum field theory and critical phenomena. Clarendon, Oxford, 2004. [ Google books | HEIDI ]
Reviews on critical phenomena and (quantum) phase transitions
- Luigi Amico, Rosario Fazio, Andreas Osterloh, and Vlatko Vedral, Entanglement in many-body systems. Rev. Mod. Phys. 80, 517 (2008). [arXiv:quant-ph/0703044v3]
General texts on statistical mechanics
- Kerson Huang, Statistical Mechanics. Wiley, 1987. [ Google books | HEIDI ]
- Linda E. Reichl, A Modern Course in Statistical Physics. Wiley Interscience, 2nd edition 1998. [ Google books (3rd ed.) | HEIDI ]
- Frederick Reif, Fundamentals of Statistical and Thermal Physics McGraw-Hill, New York, 1987. [ Google books | HEIDI ]
- Franz Schwabl, Statistische Mechanik. Springer, Heidelberg, 2000. [ Google books | HEIDI ]
- M. Toda, R. Kubo, N. Saito, Statistical Physics, Equilibrium Statistical Mechanics, Springer, 2nd edition 1992. [ Google books | HEIDI ]
General texts on quantum field theory
- Brian Hatfield, Quantum Field Theory of Point Particles and Strings. Addison Wesley, Oxford, 2010. [ Google books | HEIDI ]
- Michael E. Peskin, Daniel V. Schroeder An introduction to quantum field theory. Westview, Boulder, 2006. [ Google books | HEIDI ]
- Xiao-Gang Wen, Quantum Field Theory of Many-Body Systems. OUP, Oxford, 2010. [ Google books | HEIDI ]
- Experiments realising critical opalescence and supercritical fluidity in Water and Carbon Dioxide (further, commercial video with explanations).
- Applet simulating the 2D Ising model (You may have to adapt your Java settings to not block this page as well as isingApplet.html and isingText.html in the same path).
- 2D Ising model MC-simulator by D. on Wolfram.
- Visualization of the real-space renormalisation group for a 2D Ising system by D. Ashton (Straight to video on youtube).
- Visualization of the scale invariance of critical fluctuations of a 2D Ising system
Exercises:
Exercises will be held in general (exceptions posted above) on Fridays, 14:15-15:45 hrs, in SR 1.404, INF 227 (KIP), starting on 28/04/17. Tutor: Christian Schmied (Please register here.)
The problem sets will available for download here.
Credit Points:
Problem sets must be handed in and will be marked. Achieving a minimum of 50% will be the condition to obtain 8 CPs for the lecture.