Reinforcement learning of quantum circuit architectures for molecular potential energy curves

TL;DR

This paper introduces a reinforcement learning method to automatically generate problem-specific quantum circuits for molecular energy calculations, improving adaptability and interpretability over existing approaches.

Contribution

The paper presents a novel RL framework for generating quantum circuits tailored to molecular Hamiltonians, enabling flexible and interpretable circuit design for quantum chemistry applications.

Findings

Effective for lithium hydride molecules with 4 and 6 qubits

Successfully applied to an 8-qubit H4 chain

Circuits are interpretable and physically meaningful

Abstract

Quantum chemistry and optimization are two of the most prominent applications of quantum computers. Variational quantum algorithms have been proposed for solving problems in these domains. However, the design of the quantum circuit ansatz remains a challenge. Of particular interest is developing a method to generate circuits for any given instance of a problem, not merely a circuit tailored to a specific instance of the problem. To this end, we present a reinforcement learning (RL) approach to learning a problem-dependent quantum circuit mapping, which outputs a circuit for the ground state of a Hamiltonian from a given family of parameterized Hamiltonians. For quantum chemistry, our RL framework takes as input a molecule and a discrete set of bond distances, and it outputs a bond-distance-dependent quantum circuit for arbitrary bond distances along the potential energy curve. The inherently non-greedy approach of our RL method contrasts with existing greedy approaches to adaptive, problem-tailored circuit constructions. We demonstrate its effectiveness for the four-qubit and six-qubit lithium hydride molecules, as well as an eight-qubit H$_4$ chain. Our learned circuits are interpretable in a physically meaningful manner, thus paving the way for applying RL to the development of novel quantum circuits for the ground states of large-scale molecular systems.