📝 SummarXiv

Abstract

We study the asymptotic behavior of continuous-time, time-inhomogeneous Markovian quantum dynamics in a stationary random environment. Under mild faithfulness and eventually positivity-improving assumptions, the normalized evolution converges almost surely to a stationary family of full-rank states, and the normalized propagators converge almost surely to a rank-one family determined by these states. Beyond a disorder-dependent threshold, these convergences occur at exponential rates that may depend on the disorder; when the environment is ergodic, the rate itself is deterministic. When the dynamical propagators display vanishing maximal temporal stochastic correlation, convergence in stochastic expectations for the above limits is faster than any power of the time separation, and improves to exponential rates when the dynamical propagators display stochastically independent increments. These expectation bounds yield disorder-uniform high-probability estimates. The framework does not require complete positivity or trace preservation and encompasses random Lindbladian evolutions and collision-model dynamics.