Issue 23, 2020

On the order problem in construction of unitary operators for the variational quantum eigensolver

Abstract

One of the main challenges in the variational quantum eigensolver (VQE) framework is construction of the unitary transformation. The dimensionality of the space for unitary rotations of N qubits is 4N − 1, which makes the choice of a polynomial subset of generators an exponentially difficult process. Moreover, due to non-commutativity of generators, the order in which they are used strongly affects results. Choosing the optimal order in a particular subset of generators requires testing the factorial number of combinations. We propose an approach based on the Lie algebra–Lie group connection and corresponding closure relations that systematically eliminates the order problem.

Graphical abstract: On the order problem in construction of unitary operators for the variational quantum eigensolver

Article information

Article type
Paper
Submitted
29 Mar 2020
Accepted
01 Jun 2020
First published
01 Jun 2020

Phys. Chem. Chem. Phys., 2020,22, 12980-12986

On the order problem in construction of unitary operators for the variational quantum eigensolver

A. F. Izmaylov, M. Díaz-Tinoco and R. A. Lang, Phys. Chem. Chem. Phys., 2020, 22, 12980 DOI: 10.1039/D0CP01707H

To request permission to reproduce material from this article, please go to the Copyright Clearance Center request page.

If you are an author contributing to an RSC publication, you do not need to request permission provided correct acknowledgement is given.

If you are the author of this article, you do not need to request permission to reproduce figures and diagrams provided correct acknowledgement is given. If you want to reproduce the whole article in a third-party publication (excluding your thesis/dissertation for which permission is not required) please go to the Copyright Clearance Center request page.

Read more about how to correctly acknowledge RSC content.

Social activity

Spotlight

Advertisements