Approximate reversibility in the context of entropy gain, information gain, and complete positivity

TL;DR

This paper extends entropy inequalities in quantum information theory, demonstrating that small deviations in entropy or information gain imply the possibility of approximately reversing quantum processes and correcting noise.

Contribution

The paper introduces new bounds and remainder terms for entropy gain, information gain, and complete positivity, enhancing understanding of reversibility in quantum dynamics.

Findings

Small entropy increase indicates the adjoint channel can recover the original state.

Minimal information gain suggests measurement can be approximately undone.

Approximate complete positivity correlates with near-ideal data processing inequality.

Abstract

There are several inequalities in physics which limit how well we can process physical systems to achieve some intended goal, including the second law of thermodynamics, entropy bounds in quantum information theory, and the uncertainty principle of quantum mechanics. Recent results provide physically meaningful enhancements of these limiting statements, determining how well one can attempt to reverse an irreversible process. In this paper, we apply and extend these results to give strong enhancements to several entropy inequalities, having to do with entropy gain, information gain, entropic disturbance, and complete positivity of open quantum systems dynamics. Our first result is a remainder term for the entropy gain of a quantum channel. This result implies that a small increase in entropy under the action of a subunital channel is a witness to the fact that the channel's adjoint can be used as a recovery map to undo the action of the original channel. Our second result regards the information gain of a quantum measurement, both without and with quantum side information. We find here that a small information gain implies that it is possible to undo the action of the original measurement if it is efficient. The result also has operational ramifications for the information-theoretic tasks known as measurement compression without and with quantum side information. Our third result shows that the loss of Holevo information caused by the action of a noisy channel on an input ensemble of quantum states is small if and only if the noise can be approximately corrected on average. We finally establish that the reduced dynamics of a system-environment interaction are approximately completely positive and trace-preserving if and only if the data processing inequality holds approximately.