Iterative Layerwise Training for Quantum Approximate Optimization Algorithm

TL;DR

This paper introduces an iterative layerwise optimization method for QAOA that reduces computational costs and can improve approximation ratios, especially when combined with effective initialization strategies.

Contribution

The paper proposes an iterative layerwise optimization approach for QAOA, demonstrating reduced costs and potential improvements over full optimization.

Findings

Optimization cost is significantly reduced with iterative layerwise strategy.

Combining proper initialization with the iterative approach enhances performance.

In some cases, the iterative method outperforms full optimization in approximation ratio.

Abstract

The capability of the quantum approximate optimization algorithm (QAOA) in solving the combinatorial optimization problems has been intensively studied in recent years due to its application in the quantum-classical hybrid regime. Despite having difficulties that are innate in the variational quantum algorithms (VQA), such as barren plateaus and the local minima problem, QAOA remains one of the applications that is suitable for the recent noisy intermediate scale quantum (NISQ) devices. Recent works have shown that the performance of QAOA largely depends on the initial parameters, which motivate parameter initialization strategies to obtain good initial points for the optimization of QAOA. On the other hand, optimization strategies focus on the optimization part of QAOA instead of the parameter initialization. Instead of having absolute advantages, these strategies usually impose trade-offs to the performance of the optimization problems. One of such examples is the layerwise optimization strategy, in which the QAOA parameters are optimized layer-by-layer instead of the full optimization. The layerwise strategy costs less in total compared to the full optimization, in exchange of lower approximation ratio. In this work, we propose the iterative layerwise optimization strategy and explore the possibility for the reduction of optimization cost in solving problems with QAOA. Using numerical simulations, we found out that by combining the iterative layerwise with proper initialization strategies, the optimization cost can be significantly reduced in exchange for a minor reduction in the approximation ratio. We also show that in some cases, the approximation ratio given by the iterative layerwise strategy is even higher than that given by the full optimization.