The pointer basis and the feedback stabilization of quantum systems

TL;DR

This paper links the pointer basis concept to feedback stabilization in quantum systems, showing that strong feedback can stabilize states close to the pointer basis, with implications for quantum control and decoherence management.

Contribution

It demonstrates that the pointer basis can be used to optimize feedback control for stabilizing quantum states, especially in linear Gaussian systems.

Findings

Strong feedback stabilizes systems in pointer basis states with high fidelity.

Optimal unravelling induces a basis close to the pointer basis even with moderate feedback.

Weak feedback fails to produce a basis near the pointer basis.

Abstract

The dynamics for an open quantum system can be `unravelled' in infinitely many ways, depending on how the environment is monitored, yielding different sorts of conditioned states, evolving stochastically. In the case of ideal monitoring these states are pure, and the set of states for a given monitoring forms a basis (which is overcomplete in general) for the system. It has been argued elsewhere [D. Atkins et al., Europhys. Lett. 69, 163 (2005)] that the `pointer basis' as introduced by Zurek and Paz [Phys. Rev. Lett 70, 1187(1993)], should be identified with the unravelling-induced basis which decoheres most slowly. Here we show the applicability of this concept of pointer basis to the problem of state stabilization for quantum systems. In particular we prove that for linear Gaussian quantum systems, if the feedback control is assumed to be strong compared to the decoherence of the pointer basis, then the system can be stabilized in one of the pointer basis states with a fidelity close to one (the infidelity varies inversely with the control strength). Moreover, if the aim of the feedback is to maximize the fidelity of the unconditioned system state with a pure state that is one of its conditioned states, then the optimal unravelling for stabilizing the system in this way is that which induces the pointer basis for the conditioned states. We illustrate these results with a model system: quantum Brownian motion. We show that even if the feedback control strength is comparable to the decoherence, the optimal unravelling still induces a basis very close to the pointer basis. However if the feedback control is weak compared to the decoherence, this is not the case.