Exploring constrained quantum control landscapes

TL;DR

This paper investigates how constraints on control resources affect the topology of quantum control landscapes, revealing conditions for optimal solutions, trapping extrema, and the formation of connected level sets in quantum systems.

Contribution

It provides a simulation-based analysis of constrained quantum control landscapes, highlighting the effects of control resource limitations on landscape topology and optimal solutions.

Findings

Optimal control solutions form connected level sets under sufficient control resources.

Insufficient controls lead to trapping extrema and saddle points.

Decreasing control fluence shrinks optimal level sets to isolated points, creating suboptimal traps.

Abstract

The broad success of optimally controlling quantum systems with external fields has been attributed to the favorable topology of the underlying control landscape, where the landscape is the physical observable as a function of the controls. The control landscape can be shown to contain no suboptimal trapping extrema upon satisfaction of reasonable physical assumptions, but this topological analysis does not hold when significant constraints are placed on the control resources. This work employs simulations to explore the topology and features of the control landscape for pure-state population transfer with a constrained class of control fields. The fields are parameterized in terms of a set of uniformly spaced spectral frequencies, with the associated phases acting as the controls. Optimization results reveal that the minimum number of phase controls necessary to assure a high yield in the target state has a special dependence on the number of accessible energy levels in the quantum system, revealed from an analysis of the first- and second-order variation of the yield with respect to the controls. When an insufficient number of controls and/or a weak control fluence are employed, trapping extrema and saddle points are observed on the landscape. When the control resources are sufficiently flexible, solutions producing the globally maximal yield are found to form connected `level sets' of continuously variable control fields that preserve the yield. These optimal yield level sets are found to shrink to isolated points on the top of the landscape as the control field fluence is decreased, and further reduction of the fluence turns these points into suboptimal trapping extrema on the landscape. Although constrained control fields can come in many forms beyond the cases explored here, the behavior found in this paper is illustrative of the impacts that constraints can introduce.