Parametrized constant-depth quantum neuron

TL;DR

This paper introduces a parametrized quantum neuron framework that uses kernel machines with various feature mappings, enabling constant-depth circuits and improved pattern fitting, demonstrated through toy problems and digit recognition.

Contribution

It presents a novel, flexible quantum neuron model with parametrized activation functions and efficient constant-depth circuits, enhancing pattern fitting and practical quantum advantage.

Findings

The proposed neuron applies a tensor-product feature mapping with constant depth.

Parametrization allows better fitting of underlying patterns than existing neurons.

Demonstrated improved performance in toy problems and handwritten digit recognition.

Abstract

Quantum computing has been revolutionizing the development of algorithms. However, only noisy intermediate-scale quantum devices are available currently, which imposes several restrictions on the circuit implementation of quantum algorithms. In this paper, we propose a framework that builds quantum neurons based on kernel machines, where the quantum neurons differ from each other by their feature space mappings. Besides contemplating previous schemes, our generalized framework can instantiate quantum neurons with other feature mappings. We present here a neuron that applies a tensor-product feature mapping to an exponentially larger space. The proposed neuron is implemented by a circuit of constant depth with a linear number of elementary single-qubit gates. The existing neuron applies a phase-based feature mapping with an exponentially expensive circuit implementation, even using multi-qubit gates. Additionally, the proposed neuron has parameters that can change its activation function shape. Here, we show the activation function shape of each quantum neuron. It turns out that parametrization allows the proposed neuron to optimally fit underlying patterns that the existing neuron cannot fit, as demonstrated in the toy problems addressed here. The feasibility of those quantum neuron solutions is also contemplated in the demonstration through executions on a quantum simulator. Finally, we compare those kernel-based quantum neurons in the problem of handwritten digit recognition, where the performances of quantum neurons that implement classical activation functions are also contrasted here. The repeated evidence of the parametrization potential achieved in real-life problems allows concluding that this work provides a quantum neuron with improved discriminative abilities. As a consequence, the generalized framework of quantum neurons can contribute toward practical quantum advantage.