Measurement-assisted Landau-Zener transitions

TL;DR

This paper explores how nonselective quantum measurements can be optimally timed to accelerate Landau-Zener transitions, revealing nonmonotonic effects and developing algorithms for control optimization.

Contribution

It introduces a method to optimize measurement timings for Landau-Zener transitions, combining analytical and numerical techniques, including dynamic programming, to handle complex local maxima.

Findings

Optimal measurement timings significantly enhance transition probabilities.

Nonmonotonic behavior observed with increasing coupling parameter.

Efficient algorithms developed for measurement-based quantum control.

Abstract

Nonselective quantum measurements, i.e., measurements without reading the results, are often considered as a resource for manipulating quantum systems. In this work, we investigate optimal acceleration of the Landau-Zener (LZ) transitions by non-selective quantum measurements. We use the measurements of a population of a diabatic state of the LZ system at certain time instants as control and find the optimal time instants which maximize the LZ transition. We find surprising nonmonotonic behavior of the maximal transition probability with increase of the coupling parameter when the number of measurements is large. This transition probability gives an optimal approximation to the fundamental quantum Zeno effect (which corresponds to continuous measurements) by a fixed number of discrete measurements. The difficulty for the analysis is that the transition probability as a function of time instants has a huge number of local maxima. We resolve this problem both analytically by asymptotic analysis and numerically by the development of efficient algorithms mainly based on the dynamic programming. The proposed numerical methods can be applied, besides this problem, to a wide class of measurement-based optimal control problems.