Dynamics of Open Quantum Systems I, Oscillation and Decay

TL;DR

This paper develops a framework to analyze the dynamics of finite-dimensional quantum systems interacting with reservoirs, revealing explicit oscillating and decaying behaviors and establishing Markovian evolution under minimal regularity assumptions.

Contribution

It introduces a detailed spectral analysis linking the dynamics to Mourre theory, allowing polynomial decay of reservoir correlations and providing a general approach for open quantum systems.

Findings

Explicit oscillating and decaying parts of the dynamics identified

Reduced system evolution shown to be Markovian for all times

Decay of reservoir correlations only needs polynomial decay

Abstract

We develop a framework to analyze the dynamics of a finite-dimensional quantum system $\rm S$ in contact with a reservoir $\rm R$. The full, interacting $\rm SR$ dynamics is unitary. The reservoir has a stationary state but otherwise dissipative dynamics. We identify a main part of the full dynamics, which approximates it for small values of the $\rm SR$ coupling constant, uniformly for all times $t\ge 0$. The main part consists of explicit oscillating and decaying parts. We show that the reduced system evolution is Markovian for all times. The technical novelty is a detailed analysis of the link between the dynamics and the spectral properties of the generator of the $\rm SR$ dynamics, based on Mourre theory. We allow for $\rm SR$ interactions with little regularity, meaning that the decay of the reservoir correlation function only needs to be polynomial in time, improving on the previously required exponential decay. In this work we distill the structural and technical ingredients causing the characteristic features of oscillation and decay of the $\rm SR$ dynamics. In the companion paper [27] we apply the formalism to the concrete case of an $N$-level system linearly coupled to a spatially infinitely extended thermal bath of non-interacting Bosons.