Stochastic quantum trajectories demonstrate the Quantum Zeno Effect in open spin 1/2, spin 1 and spin 3/2 systems

TL;DR

This paper demonstrates the Quantum Zeno Effect in open spin systems of various sizes using stochastic quantum trajectories, revealing how measurement strength influences system dynamics and eigenstate exploration.

Contribution

It introduces a detailed analysis of the Quantum Zeno Effect in higher-spin systems using quantum state diffusion, highlighting the impact of measurement strength on system behavior.

Findings

Quantum Zeno Effect observed across spin 1/2, 1, and 3/2 systems.

Stronger measurements increase dwell time near eigenstates and alter Rabi oscillations.

Measurement strength influences which eigenstates are predominantly explored.

Abstract

We investigate the Quantum Zeno Effect in spin 1/2, spin 1 and spin 3/2 open quantum systems undergoing Rabi oscillations, revealing unexplored features for the spin 1 and spin 3/2 systems. The systems interact with an environment designed to perform continuous measurements of an observable, driving the systems stochastically towards one of the eigenstates of the corresponding operator. The system-environment coupling constant represents the strength of the measurement. Stochastic quantum trajectories are generated by unravelling a Markovian Lindblad master equation using the quantum state diffusion formalism. These are regarded as a more appropriate representation of system behaviour than consideration of the averaged evolution since the latter can mask the effect of measurement. Complete positivity is maintained and thus the trajectories can be considered as physically meaningful. The Quantum Zeno Effect is investigated over a range of measurement strengths. Increasing the strength leads to greater system dwell in the vicinity of the eigenstates of the measured observable and lengthens the time taken by the system to return to that eigenstate,thus the Quantum Zeno Effect emerges. For very strong measurement, the Rabi oscillations resemble randomly occurring near-instantaneous jumps between eigenstates. The trajectories followed by the quantum system are heavily dependent on the measurement strength which other than slowing down and adding noise to the Rabi oscillations, changes the paths taken in spin phase space from a circular precession into elaborate figures-of-eight. For spin 1 and spin 3/2 systems, the measurement strength determines which eigenstates are explored and the Quantum Zeno Effect is stronger when the system dwells in the vicinity of certain eigenstates compared to others.