Litcius/Paper detail

Quantum trajectory entanglement in various unravelings of Markovian dynamics

Tatiana Vovk, Hannes Pichler

2024Physical review. A/Physical review, A12 citationsDOI

Abstract

The cost of classical simulations of quantum many-body dynamics is often determined by the amount of entanglement in the system. In this paper, we study entanglement in stochastic quantum trajectory approaches that solve master equations describing open quantum system dynamics. First, we introduce and compare adaptive trajectory unravelings of master equations. Specifically, building on [Phys. Rev. Lett. 128, 243601 (2022)], we study several greedy algorithms that generate trajectories with a low average entanglement entropy. Second, we consider various conventional unravelings of a one-dimensional open random Brownian circuit and locate the transition points from area- to volume-law-entangled trajectories. Third, we compare various trajectory unravelings using matrix product states with a direct integration of the master equation using matrix product operators. We provide concrete examples of dynamics, for which the simulation cost of stochastic trajectories is exponentially smaller than the one of matrix product operators.

Topics & Concepts

Quantum entanglementMarkov processDynamics (music)TrajectoryQuantumStatistical physicsQuantum dynamicsPhysicsQuantum mechanicsMathematicsStatisticsAcousticsQuantum many-body systemsQuantum Information and CryptographyQuantum Computing Algorithms and Architecture
Quantum trajectory entanglement in various unravelings of Markovian dynamics | Litcius