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Many-body wavefunctions for quantum impurities out of equilibrium
We present a method for calculating the time-dependent many-body wavefunction that follows a local quench. We apply the method to the voltage-driven nonequilibrium Kondo model to find the exact time-evolving wavefunction following a quench where the dot is suddenly attached to the leads at \(t=0\)....
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| description | We present a method for calculating the time-dependent many-body wavefunction that follows a local quench. We apply the method to the voltage-driven nonequilibrium Kondo model to find the exact time-evolving wavefunction following a quench where the dot is suddenly attached to the leads at \(t=0\). The method, which does not use Bethe ansatz, also works in other quantum impurity models (we include results for the interacting resonant level and the Anderson impurity model) and may be of wider applicability. In the particular case of the Kondo model, we show that the long-time limit (with the system size taken to infinity first) of the time-evolving wavefunction is a current-carrying nonequilibrium steady state that satisfies the Lippmann-Schwinger equation. We show that the electric current in the time-evolving wavefunction is given by a series expression that can be expanded either in weak coupling or in strong coupling, converging to all orders in the steady-state limit in either case. The series agrees to leading order with known results in the well-studied regime of weak antiferromagnetic coupling and also reveals another universal regime of strong ferromagnetic coupling, with Kondo temperature \(T_K^{(F)} = D e^{-\frac{3\pi^2}{8} \rho |J|}\) (\(J |
| doi_str_mv | 10.48550/arxiv.1912.02956 |
| format | article |
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We apply the method to the voltage-driven nonequilibrium Kondo model to find the exact time-evolving wavefunction following a quench where the dot is suddenly attached to the leads at \(t=0\). The method, which does not use Bethe ansatz, also works in other quantum impurity models (we include results for the interacting resonant level and the Anderson impurity model) and may be of wider applicability. In the particular case of the Kondo model, we show that the long-time limit (with the system size taken to infinity first) of the time-evolving wavefunction is a current-carrying nonequilibrium steady state that satisfies the Lippmann-Schwinger equation. We show that the electric current in the time-evolving wavefunction is given by a series expression that can be expanded either in weak coupling or in strong coupling, converging to all orders in the steady-state limit in either case. The series agrees to leading order with known results in the well-studied regime of weak antiferromagnetic coupling and also reveals another universal regime of strong ferromagnetic coupling, with Kondo temperature \(T_K^{(F)} = D e^{-\frac{3\pi^2}{8} \rho |J|}\) (\(J<0\), \(\rho|J|\to\infty\)). In this regime, the differential conductance \(dI/dV\) reaches the unitarity limit \(2e^2/h\) asymptotically at large voltage or temperature.</description><identifier>EISSN: 2331-8422</identifier><identifier>DOI: 10.48550/arxiv.1912.02956</identifier><language>eng</language><publisher>Ithaca: Cornell University Library, arXiv.org</publisher><subject>Antiferromagnetism ; Electric potential ; Ferromagnetism ; Kondo temperature ; Resistance ; Steady state ; Time dependence ; Voltage ; Wave functions</subject><ispartof>arXiv.org, 2021-06</ispartof><rights>2021. This work is published under http://arxiv.org/licenses/nonexclusive-distrib/1.0/ (the “License”). 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The series agrees to leading order with known results in the well-studied regime of weak antiferromagnetic coupling and also reveals another universal regime of strong ferromagnetic coupling, with Kondo temperature \(T_K^{(F)} = D e^{-\frac{3\pi^2}{8} \rho |J|}\) (\(J<0\), \(\rho|J|\to\infty\)). 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| subjects | Antiferromagnetism Electric potential Ferromagnetism Kondo temperature Resistance Steady state Time dependence Voltage Wave functions |
| title | Many-body wavefunctions for quantum impurities out of equilibrium |
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