Litcius/Paper detail

A time-dependent regularization of the Redfield equation

Antonio D’Abbruzzo, Vasco Cavina, Vittorio Giovannetti

2023SciPost Physics20 citationsDOIOpen Access PDF

Abstract

We introduce a new regularization of the Redfield equation based on a replacement of the Kossakowski matrix with its closest positive semidefinite neighbor. Unlike most of the existing approaches, this procedure is capable of retaining the time dependence of the Kossakowski matrix, leading to a completely positive divisible quantum process. Using the dynamics of an exactly-solvable three-level open system as a reference, we show that our approach performs better during the transient evolution, if compared to other approaches like the partial secular master equation or the universal Lindblad equation. To make the comparison between different regularization schemes independent from the initial state, we introduce a new quantitative approach based on the Choi-Jamiołkowski isomorphism.

Topics & Concepts

Regularization (linguistics)Master equationLindblad equationApplied mathematicsMatrix (chemical analysis)MathematicsQuantumIsomorphism (crystallography)Computer sciencePhysicsQuantum mechanicsArtificial intelligenceCrystallographyComposite materialCrystal structureChemistryMaterials scienceQuantum Information and CryptographySpectroscopy and Quantum Chemical StudiesQuantum Computing Algorithms and Architecture