Inchworm quasi Monte Carlo for quantum impurities

Strand, Hugo U. R.; Kleinhenz, Joseph; Krivenko, Igor

doi:10.1103/physrevb.110.l121120

Phys. Rev. B

2024

DOI: 10.1103/physrevb.110.l121120

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Inchworm quasi Monte Carlo for quantum impurities

Hugo U. R. Strand,

Joseph Kleinhenz,

Igor Krivenko

Abstract: The inchworm expansion is a promising approach to solving strongly correlated quantum impurity models due to its reduction of the sign problem in real and imaginary time. However, inchworm Monte Carlo is computationally expensive, converging as 1/N where N is the number of samples. We show that the imaginary-time integration is amenable to quasi Monte Carlo, with parametrically better 1/N convergence, by mapping the Sobol low-discrepancy sequence from the hypercube to the simplex with the so-called Root transf… Show more

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2024

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Cited by 2 publications

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Steady-state properties of multi-orbital systems using quantum Monte Carlo

Erpenbeck,

Blommel,

Zhang

et al. 2024

The Journal of Chemical Physics

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A precise dynamical characterization of quantum impurity models with multiple interacting orbitals is challenging. In quantum Monte Carlo methods, this is embodied by sign problems. A dynamical sign problem makes it exponentially difficult to simulate long times. A multi-orbital sign problem generally results in a prohibitive computational cost for systems with multiple impurity degrees of freedom even in static equilibrium calculations. Here, we present a numerically exact inchworm method that simultaneously alleviates both sign problems, enabling simulation of multi-orbital systems directly in the equilibrium or nonequilibrium steady-state. The method combines ideas from the recently developed steady-state inchworm Monte Carlo framework [Erpenbeck et al., Phys. Rev. Lett. 130, 186301 (2023)] with other ideas from the equilibrium multi-orbital inchworm algorithm [Eidelstein et al., Phys. Rev. Lett. 124, 206405 (2020)]. We verify our method by comparison with analytical limits and numerical results from previous methods.

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Steady-state properties of multi-orbital systems using quantum Monte Carlo

Erpenbeck,

Blommel,

Zhang

et al. 2024

The Journal of Chemical Physics

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Nonequilibrium steady state full counting statistics in the noncrossing approximation

Zemach,

Erpenbeck,

Gull

et al. 2024

The Journal of Chemical Physics

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Quantum transport is often characterized not just by mean observables like the particle or energy current but by their fluctuations and higher moments, which can act as detailed probes of the physical mechanisms at play. However, relatively few theoretical methods are able to access the full counting statistics (FCS) of transport processes through electronic junctions in strongly correlated regimes. While most experiments are concerned with steady state properties, most accurate theoretical methods rely on computationally expensive propagation from a tractable initial state. Here, we propose a simple approach for computing the FCS through a junction directly at the steady state, utilizing the propagator noncrossing approximation. Compared to time propagation, our method offers reduced computational cost at the same level of approximation, but the idea can also be used within other approximations or as a basis for numerically exact techniques. We demonstrate the method’s capabilities by investigating the impact of lead dimensionality on electronic transport in the nonequilibrium Anderson impurity model at the onset of Kondo physics. Our results reveal a distinct signature of one dimensional leads in the noise and Fano factor not present for other dimensionalities, showing the potential of FCS measurements as a probe of the environment surrounding a quantum dot.

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Inchworm quasi Monte Carlo for quantum impurities

Cited by 2 publications

References 51 publications

Steady-state properties of multi-orbital systems using quantum Monte Carlo

Steady-state properties of multi-orbital systems using quantum Monte Carlo

Nonequilibrium steady state full counting statistics in the noncrossing approximation

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