Analysis on the von Neumann entropy under the measurement-based feedback control (2408.17442v1)

Abstract: The measurement-based feedback (MBF) control offers several powerful means for preparing the desired target quantum state. Therefore, it is important to investigate fundamental properties of MBF. In particular, how the entropy of the controlled system under the MBF behaves is of great interest. In this study, we examine this problem by deriving a sufficient condition that the time derivative of the von Neumann entropy is nonnegative under the MBF control. This result is rigorously characterized by the variance of the system observable and the quantumness of a given decoherence. We show the validity of the result and physical interpretation in the example of qubit stabilizing.

• The paper derives a sufficient condition for the time derivative of von Neumann entropy to be non-negative in quantum systems under measurement-based feedback control with decoherence.
• This condition, involving system observable variance and decoherence effects, suggests entropy will not decrease over time if met, indicating system stability under specific settings.
• Verified with a qubit system example, these theoretical findings inform the design of quantum feedback techniques where controlling entropy dynamics is critical.

Analysis of von Neumann Entropy in Measurement-Based Feedback Control

This essay presents an overview of the paper "Analysis on the von Neumann entropy under the measurement-based feedback control" by Kohei Kobayashi, which offers a substantial analysis of quantum control systems with an emphasis on the von Neumann entropy within measurement-based feedback (MBF) control frameworks.

Context and Motivation

Rapid advancement in quantum technologies has foregrounded the importance of proficient quantum system control. Quantum control systems are critical for enhancing quantum information technologies, including computation, communication, and metrology. Measurement-based feedback control is an instrumental methodology that aligns with the need to prepare and maintain desired quantum states. In such systems, entropy behavior, specifically the von Neumann entropy, plays a pivotal role in understanding the control mechanisms under external influences, like decoherence.

Main Contributions

In this paper, the author addresses the behavior of von Neumann entropy in quantum systems under MBF control, particularly considering the effects of decoherence. A significant contribution is the derivation of a sufficient condition for the non-negativity of the von Neumann entropy's time derivative in these feedback systems. This condition involves the variance of system observables and quantumness introduced by decoherence.

The derived sufficient condition holds that the von Neumann entropy's rate of change, given by the time derivative, is non-negative if: $$\mathbb{E}[\langle [M^\dagger, M] \rangle] \geq 4{\rm Var}\left[ \mathbb{E}[\rho_t] \right],$$ where $M$ embodies the decoherence operator, and ${\rm Var}\left[ \mathbb{E}[\rho_t] \right]$ signifies the variance relative to the observable under continuous measurement.

Despite its rigor, this result provides a sufficient but not necessary condition, limiting its application. The paper verifies these theoretical insights using a qubit system example, demonstrating the conditions under which entropy increases.

Key Results and Implications

The paper confirms that von Neumann entropy can show diverse behavior during quantum feedback operations, dependent on the interaction specifics between measurement and system operators. Results affirm that if the commutator expectations and variance conditions are satisfied, the entropy will not decrease over time, suggesting stability in quantum control systems under the designated settings.

Implications and Future Directions

The implications of these findings potentially extend to designing improved feedback techniques for quantum systems, where controlling entropy dynamics is critical for operational efficiency. This work paves the way for further exploration into characterizing fundamental limits on entropy behavior in quantum feedback systems with environmental interactions.

Future research might aim at refining these theoretical boundaries, aiming to establish necessary conditions for entropy evolution under MBF, enhancing our understanding of quantum state dynamics. Additionally, exploring these principles in more complex quantum systems or different decoherence scenarios could augment their applicability and efficacy in real-world quantum technologies.

In conclusion, this paper advances the discourse in quantum system control through a focused analysis of von Neumann entropy, offering valuable insights into entropy dynamics in quantum feedback mechanisms.