Paper ID: 2306.03741

Classical-to-Quantum Transfer Learning Facilitates Machine Learning with Variational Quantum Circuit

Jun Qi, Chao-Han Huck Yang, Pin-Yu Chen, Min-Hsiu Hsieh, Hector Zenil, Jesper Tegner

While Quantum Machine Learning (QML) is an exciting emerging area, the accuracy of the loss function still needs to be improved by the number of available qubits. Here, we reformulate the QML problem such that the approximation error (representation power) does not depend on the number of qubits. We prove that a classical-to-quantum transfer learning architecture using a Variational Quantum Circuit (VQC) improves the representation and generalization (estimation error) capabilities of the VQC model. We derive analytical bounds for the approximation and estimation error. We show that the architecture of classical-to-quantum transfer learning leverages pre-trained classical generative AI models, making it easier to find the optimal parameters for the VQC in the training stage. To validate our theoretical analysis, we perform experiments on single-dot and double-dot binary classification tasks for charge stability diagrams in semiconductor quantum dots, where the related empirical results support our theoretical findings. Our analytical and empirical results demonstrate the effectiveness of classical-to-quantum transfer learning architecture in realistic tasks. This sets the stage for accelerating QML applications beyond the current limits of available qubits.

Submitted: May 18, 2023