Partially Unitary Learning

TL;DR

This paper introduces a method for optimizing partially unitary operators to maximize fidelity in quantum state mappings, with an iterative algorithm and practical software implementation.

Contribution

It formulates a novel optimization problem for partial unitarity in quantum channels and provides an iterative solution algorithm with demonstrated applications.

Findings

Developed an iterative algorithm for partial unitarity optimization.

Achieved high-fidelity quantum state mappings using the method.

Provided software for practical implementation of the algorithm.

Abstract

The problem of an optimal mapping between Hilbert spaces $IN$ of $\left|\psi\right\rangle$ and $OUT$ of $\left|\phi\right\rangle$ based on a set of wavefunction measurements (within a phase) $\psi_l \to \phi_l$, $l=1\dots M$, is formulated as an optimization problem maximizing the total fidelity $\sum_{l=1}^{M} \omega^{(l)} \left|\langle\phi_l|\mathcal{U}|\psi_l\rangle\right|^2$ subject to probability preservation constraints on $\mathcal{U}$ (partial unitarity). The constructed operator $\mathcal{U}$ can be considered as an $IN$ to $OUT$ quantum channel; it is a partially unitary rectangular matrix (an isometry) of dimension $\dim(OUT) \times \dim(IN)$ transforming operators as $A^{OUT}=\mathcal{U} A^{IN} \mathcal{U}^{\dagger}$. An iterative algorithm for finding the global maximum of this optimization problem is developed, and its application to a number of problems is demonstrated. A software product implementing the algorithm is available from the authors.