Litcius/Paper detail

Markov Approximations of the Evolution of Quantum Systems

John Gough, Yu. N. Orlov, В. Ж. Сакбаев, O. G. Smolyanov

2022Doklady Mathematics11 citationsDOIOpen Access PDF

Abstract

Abstract The convergence in probability of a sequence of iterations of independent random quantum dynamical semigroups to a Markov process describing the evolution of an open quantum system is studied. The statistical properties of the dynamics of open quantum systems with random generators of Markovian evolution are described in terms of the law of large numbers for operator-valued random processes. For compositions of independent random semigroups of completely positive operators, the convergence of mean values to a semigroup described by the Gorini–Kossakowski–Sudarshan–Lindblad equation is established. Moreover, a sequence of random operator-valued functions with values in the set of operators without the infinite divisibility property is shown to converge in probability to an operator-valued function with values in the set of infinitely divisible operators.

Topics & Concepts

MathematicsSemigroupConvergence of random variablesOperator (biology)Markov processRandom compact setSequence (biology)Quantum probabilityMarkov chainRandom functionDiscrete mathematicsInfinite divisibilityPure mathematicsApplied mathematicsQuantumQuantum processRandom variableQuantum dynamicsQuantum mechanicsPhysicsChemistryBiochemistryTranscription factorStatisticsGeneticsBiologyRepressorGeneadvanced mathematical theoriesRandom Matrices and ApplicationsQuantum Mechanics and Applications