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Auteurs principaux: Blommel, Thomas, Gardner, David J., Woodward, Carol S., Gull, Emanuel
Format: Preprint
Publié: 2024
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Accès en ligne:https://arxiv.org/abs/2405.08737
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author Blommel, Thomas
Gardner, David J.
Woodward, Carol S.
Gull, Emanuel
author_facet Blommel, Thomas
Gardner, David J.
Woodward, Carol S.
Gull, Emanuel
contents The non-equilibrium Green's function gives access to one-body observables for quantum systems. Of particular interest are quantities such as density, currents, and absorption spectra which are important for interpreting experimental results in quantum transport and spectroscopy. We present an integration scheme for the Green's function's equations of motion, the Kadanoff-Baym equations (KBE), which is both adaptive in the time integrator step size and method order as well as the history integration order. We analyze the importance of solving the KBE self-consistently and show that adapting the order of history integral evaluation is important for obtaining accurate results. To examine the efficiency of our method, we compare runtimes to a state of the art fixed time step integrator for several test systems and show an order of magnitude speedup at similar levels of accuracy.
format Preprint
id arxiv_https___arxiv_org_abs_2405_08737
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Adaptive Time Stepping for the Two-Time Integro-Differential Kadanoff-Baym Equations
Blommel, Thomas
Gardner, David J.
Woodward, Carol S.
Gull, Emanuel
Computational Physics
Strongly Correlated Electrons
Nuclear Theory
Quantum Physics
The non-equilibrium Green's function gives access to one-body observables for quantum systems. Of particular interest are quantities such as density, currents, and absorption spectra which are important for interpreting experimental results in quantum transport and spectroscopy. We present an integration scheme for the Green's function's equations of motion, the Kadanoff-Baym equations (KBE), which is both adaptive in the time integrator step size and method order as well as the history integration order. We analyze the importance of solving the KBE self-consistently and show that adapting the order of history integral evaluation is important for obtaining accurate results. To examine the efficiency of our method, we compare runtimes to a state of the art fixed time step integrator for several test systems and show an order of magnitude speedup at similar levels of accuracy.
title Adaptive Time Stepping for the Two-Time Integro-Differential Kadanoff-Baym Equations
topic Computational Physics
Strongly Correlated Electrons
Nuclear Theory
Quantum Physics
url https://arxiv.org/abs/2405.08737