Related papers: Unleashing the Expressive Power of Pulse-Based Quantum Neural Networks

Unleashing the Expressive Power of Pulse-Based Quantum Neural Networks

URL: http://arxiv.org/abs/2402.02880v2
Date: Wed, 26 Jun 2024 00:20:37 GMT
Title: Unleashing the Expressive Power of Pulse-Based Quantum Neural Networks
Authors: Han-Xiao Tao, Jiaqi Hu, Re-Bing Wu,
Abstract summary: Quantum machine learning (QML) based on Noisy Intermediate-Scale Quantum (NISQ) devices hinges on the optimal utilization of limited quantum resources. gate-based QML models are user-friendly for software engineers. pulse-based models enable the construction of "infinitely" deep quantum neural networks within the same time.
Score: 0.46085106405479537
License: http://creativecommons.org/licenses/by/4.0/
Abstract: Quantum machine learning (QML) based on Noisy Intermediate-Scale Quantum (NISQ) devices hinges on the optimal utilization of limited quantum resources. While gate-based QML models are user-friendly for software engineers, their expressivity is restricted by the permissible circuit depth within a finite coherence time. In contrast, pulse-based models enable the construction of "infinitely" deep quantum neural networks within the same time, which may unleash greater expressive power for complex learning tasks. In this paper, this potential is investigated from the perspective of quantum control theory. We first indicate that the nonlinearity of pulse-based models comes from the encoding process that can be viewed as the continuous limit of data-reuploading in gate-based models. Subsequently, we prove that the pulse-based model can approximate arbitrary nonlinear functions when the underlying physical system is ensemble controllable. Under this condition, numerical simulations demonstrate the enhanced expressivity by either increasing the pulse length or the number of qubits. As anticipated, we show through numerical examples that the pulse-based model can unleash more expressive power compared to the gate-based model. These findings lay a theoretical foundation for understanding and designing expressive QML models using NISQ devices.

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