Litcius/Paper detail

Non-Markovian stochastic Schrödinger equation: Matrix-product-state approach to the hierarchy of pure states

Xing Gao, Jiajun Ren, Alexander Eisfeld, Zhigang Shuai

2022Physical review. A/Physical review, A35 citationsDOIOpen Access PDF

Abstract

We derive a stochastic hierarchy of matrix product states (HOMPS) for non-Markovian dynamics in an open quantum system at finite temperature, which is numerically exact and efficient. HOMPS is obtained from the recently developed stochastic hierarchy of pure states (HOPS) by expressing HOPS in terms of formal creation and annihilation operators. The resulting stochastic first-order differential equation is then formulated in terms of matrix product states and matrix product operators. In this way the exponential complexity of HOPS can be reduced to scale polynomial with the number of particles. The validity and efficiency of HOMPS is demonstrated for the spin-boson model and long chains where each site is coupled to a structured, strongly non-Markovian environment.

Topics & Concepts

HierarchyMarkov processMathematicsMatrix (chemical analysis)State (computer science)Product (mathematics)Mathematical physicsApplied mathematicsMarkov chainStatistical physicsPhysicsLawPolitical scienceStatisticsGeometryMaterials scienceAlgorithmComposite materialSpectroscopy and Quantum Chemical StudiesQuantum many-body systemsQuantum Information and Cryptography
Non-Markovian stochastic Schrödinger equation: Matrix-product-state approach to the hierarchy of pure states | Litcius