Renormalization Group Theory & Sine-Gordon Model Lectures
Mariana Malard presents a series of lectures discussing Renormalization Group Theory and the Sine-Gordon model. Starting with a conceptual overview and general procedures, the lectures progress to topics like expressing S in terms of Green's functions, bosonization, and Kosterlitz-Thouless Phase Diagram. Dive into the details and insights shared in these informative sessions.
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Renormalization Group Theory & Sine-Gordon Model Mariana Malard
Renormalization Group Theory & Sine-Gordon Model SUMMARY OF THE LECTURES Lecture 1 January 16th Renormalization Group Theory Conceptual overview. General procedure 0: Define a field theoryAction. General procedure I: Decompose in slow and fast modes. General procedure II: Expressing S in terms of Green s functions.
Renormalization Group Theory & Sine-Gordon Model SUMMARY OF THE LECTURES Lecture 2 January 21st Renormalization Group Theory Finish general procedure II: Expressing S in terms of Green s functions. General procedure III:Averaging in the fast modes ground state. Sine-Gordon Model Conceptual overview. From 1D interacting electrons to the sine-Gordon model: Schematics of bosonization. The model. Red-marked items: updates on the original lecture plan.
Renormalization Group Theory & Sine-Gordon Model SUMMARY OF THE LECTURES Lecture 3 January 23rd Sine-Gordon Model Re-scaledAction for the sine-Gordon model. Renormalization group flows equations of the sine-Gordon model. Kosterlitz-Thouless Phase Diagram Red-marked items: updates on the original lecture plan. Gap
Renormalization Group Theory General procedure II: Expressing S in terms of Green s functions. Dyson equation: For our 2nd order expansion around the slow modes: The Green s function for the full residual Action in momentum-frequency space is thus:
Renormalization Group Theory General procedure II: Expressing S in terms of Green s functions. Rewriting the residual action:
Renormalization Group Theory General procedure II: Expressing S in terms of Green s functions. Chosen so that the linear term in the field disappears. Exercise Taking r(x) such that i.e. QUADRATIC in the field gives:
Renormalization Group Theory General procedure III: Averaging in the fast modes ground state Effective residual Action for the slow modes: Full ground state Fast modes ground state Slow modes ground state
Renormalization Group Theory General procedure III: Averaging in the fast modes ground state Green s function for the free original (i.e. in terms of the original - field) Action: From Eq. (34) to (37) in the review paper. Green s function for the free original Action projected on the fast modes subspace: https://arxiv.org/abs/1202.3481
Renormalization Group Theory General procedure III: Averaging in the fast modes ground state Effective residual Action for the slow modes: 2nd order in the interactions
Renormalization Group Theory General procedure III: Averaging in the fast modes ground state Effective residual Action for the slow modes: Recalling the original Action, we define an effective Action for the slow modes: To proceed one needs to compute the coefficients as and bs in the above expression for Seff for the field theory of interest. Here we will do that for the sine-Gordon model.
Sine-Gordon Model Conceptual overview The origin of the name is the Klein-Gordon equation. INTERACTING QUANTUM FIELD THEORY Bosonization Describes interactions with a strong pinning effect. Luttinger Liquid Models Ex.: Strongly interacting electron systems in 1D G-ology model Hubbard models
Sine-Gordon Model From 1D interacting electrons to the sine-Gordon model: Schematics of bosonization. Second-quantized tight-binding Hamiltonian for interacting electrons moving through a 1D lattice: electron-electron Coulomb repulsion ( V ) Hopping ( t ) + On-site (chemical) potential ( ) ? = 1, ,? lattice sites Reading reference: T. Giamarchi, Quantum Physics in One Dimension, Oxford University Press (2003) ? = spin orientation
Sine-Gordon Model From 1D interacting electrons to the sine-Gordon model: Schematics of bosonization. H0 can be analytically diagonalized by a Fourier transform: two spin-degenerate bands
Sine-Gordon Model From 1D interacting electrons to the sine-Gordon model: Schematics of bosonization. Low-energy theory: Linearize around the Fermi points and go to the continuum Fermion fields for right- and left-moving electrons in the continuum two spin-degenerate bands Fermion operator on the lattice
Sine-Gordon Model From 1D interacting electrons to the sine-Gordon model: Schematics of bosonization. Low-energy theory: Linearize around the Fermi points and go to the continuum Fermion fields for right- and left-moving electrons in the continuum two spin-degenerate bands Fermion operator on the lattice
Sine-Gordon Model From 1D interacting electrons to the sine-Gordon model: Schematics of bosonization. Low-energy theory: Linearize around the Fermi points and go to the continuum Fermion fields for right- and left-moving electrons in the continuum two spin-degenerate bands Fermion operator on the lattice backscattering
Sine-Gordon Model From 1D interacting electrons to the sine-Gordon model: Schematics of bosonization. Low-energy theory: Linearize around the Fermi points and go to the continuum Fermion fields for right- and left-moving electrons in the continuum two spin-degenerate bands Fermion operator on the lattice forward
Sine-Gordon Model From 1D interacting electrons to the sine-Gordon model: Schematics of bosonization. Low-energy theory: Linearize around the Fermi points and go to the continuum Fermion fields for right- and left-moving electrons in the continuum two spin-degenerate bands Fermion operator on the lattice dispervive Where is the g3-scattering? It is called umklap and requires fine tuning the filling to specifc ( commensurate ) values so it is typically absent.
Sine-Gordon Model From 1D interacting electrons to the sine-Gordon model: Schematics of bosonization. Bosonized low-energy H0: Dual boson fields Fermion fields Klein factors Keep track of the Fermi statistics Free bosons-theories, one for spin up and another for spin down
Sine-Gordon Model From 1D interacting electrons to the sine-Gordon model: Schematics of bosonization. Bosonized low-energy H0 in the charge and spin-basis: Free bosons-theories, one for the charge mode and another for the spin mode
Sine-Gordon Model From 1D interacting electrons to the sine-Gordon model: Schematics of bosonization. Bosonized low-energy full H in the charge and spin-basis: Free bosons-theory for the charge mode Velocities dressed by e-e Sine-Gordon model for the spin mode
Sine-Gordon Model From 1D interacting electrons to the sine-Gordon model: Schematics of bosonization. Bosonized low-energy full H in the charge and spin-basis:
Sine-Gordon Model The model. Hamiltonian: and canonically conjugated fields, i.e. Lagrangean:
Sine-Gordon Model Lagrangean: Action: Integration by parts Assuming field vanishes at the space-time boundaries.
Sine-Gordon Model Action: t -it, S -iS Imaginary-time rotation and Note: correspondence between the path integral and the partition function from statistical mechanics! The imaginary-time rotation yields a