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Convergence Guarantees for Discrete Mode Approximations to Non-Markovian Quantum Baths

Rahul Trivedi, Daniel Malz, J. Ignacio Cirac

2021Physical Review Letters19 citationsDOIOpen Access PDF

Abstract

Non-Markovian effects are important in modeling the behavior of open quantum systems arising in solid-state physics, quantum optics as well as in study of biological and chemical systems. The non-Markovian environment is often approximated by discrete bosonic modes, thus mapping it to a Lindbladian or Hamiltonian simulation problem. While systematic constructions of such modes have been previously proposed, the resulting approximation lacks rigorous and general convergence guarantees. In this Letter, we show that under some physically motivated assumptions on the system-environment interaction, the finite-time dynamics of the non-Markovian open quantum system computed with a sufficiently large number of modes is guaranteed to converge to the true result. Furthermore, we show that this approximation error typically falls off polynomially with the number of modes. Our results lend rigor to classical and quantum algorithms for approximating non-Markovian dynamics.

Topics & Concepts

Hamiltonian (control theory)Convergence (economics)QuantumStatistical physicsPhysicsQuantum systemOpen quantum systemQuantum algorithmApplied mathematicsQuantum dynamicsQuantum mechanicsQuantum simulatorApproximation errorMode (computer interface)Quantum error correctionHamiltonian systemApproximation theoryComputer scienceMathematicsQuantum processHigh frequency approximationQuantum computerQuantum operationQuantum opticsSpectroscopy and Quantum Chemical StudiesQuantum many-body systemsQuantum Information and Cryptography
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