6533b834fe1ef96bd129e330
RESEARCH PRODUCT
Contour calculus for many-particle functions
R. Van LeeuwenDaniel KarlssonMarkku Hyrkässubject
Statistics and ProbabilityPhysicsnon-equilibrium Green's functionsFOS: Physical sciencesGeneral Physics and AstronomyStatistical and Nonlinear PhysicsMathematical Physics (math-ph)medicine.disease01 natural sciencesKeldysh formalism010305 fluids & plasmasLangreth rulesModeling and Simulation0103 physical sciencesquantum many-body theorymedicineCalculusParticleKeldysh formalism010306 general physicskvanttifysiikkaMathematical PhysicsCalculus (medicine)description
In non-equilibrium many-body perturbation theory, Langreth rules are an efficient way to extract real-time equations from contour ones. However, the standard rules are not applicable in cases that do not reduce to simple convolutions and multiplications. We introduce a procedure for extracting real-time equations from general multi-argument contour functions with an arbitrary number of arguments. This is done for both the standard Keldysh contour, as well as the extended contour with a vertical track that allows for general initial states. This amounts to the generalization of the standard Langreth rules to much more general situations. These rules involve multi-argument retarded functions as key ingredients, for which we derive intuitive graphical rules. We apply our diagrammatic recipe to derive Langreth rules for the so-called double triangle structure and the general vertex function, relevant for the study of vertex corrections beyond the $GW$ approximation.
| year | journal | country | edition | language |
|---|---|---|---|---|
| 2019-01-01 |