Generalization Study of Quantum Neural Network
This work addresses generalization in quantum neural networks for quantum computing applications, but it appears incremental as it builds on existing quantum neural network concepts.
The paper tackles the generalization of quantum neural networks by constructing a model using quantum gates and mapping features to Hilbert space, demonstrating better generalization than classical neural networks on three public datasets.
Generalization is an important feature of neural network, and there have been many studies on it. Recently, with the development of quantum compu-ting, it brings new opportunities. In this paper, we studied a class of quantum neural network constructed by quantum gate. In this model, we mapped the feature data to a quantum state in Hilbert space firstly, and then implement unitary evolution on it, in the end, we can get the classification result by im-plement measurement on the quantum state. Since all the operations in quan-tum neural networks are unitary, the parameters constitute a hypersphere of Hilbert space. Compared with traditional neural network, the parameter space is flatter. Therefore, it is not easy to fall into local optimum, which means the quantum neural networks have better generalization. In order to validate our proposal, we evaluated our model on three public datasets, the results demonstrated that our model has better generalization than the classical neu-ral network with the same structure.