Related papers: Enhanced Squeezing and Faster Metrology from Layered Quantum Neural Networks

Enhanced Squeezing and Faster Metrology from Layered Quantum Neural Networks

URL: http://arxiv.org/abs/2512.09137v1
Date: Tue, 09 Dec 2025 21:33:22 GMT
Title: Enhanced Squeezing and Faster Metrology from Layered Quantum Neural Networks
Authors: Nickholas Gutierrez, Rodrigo Araiza Bravo, Susanne Yelin,
Abstract summary: We compare the sensing performance of quantum reservoir computers (QRCs), quantum perceptrons, and multi-layer quantum neural networks (QNNs)<n>For all models, we consider a standard metrological sequence consisting of coherent-spin preparation, one-axis-twisting dynamics, field encoding via a weak rotation, time-reversal, and collective readout.<n>Our results demonstrate that the structure of quantum neural networks can be exploited not only for computation, but also to engineer faster and more sensitive squeezing-based quantum sensors.
Score: 0.0
License: http://creativecommons.org/licenses/by/4.0/
Abstract: Spin squeezing is a powerful resource for quantum metrology, and recent hardware platforms based on interacting qubits provide multiple possible architectures to generate and reverse squeezing during a sensing protocol. In this work, we compare the sensing performance of three such architectures: quantum reservoir computers (QRCs), quantum perceptrons, and multi-layer quantum neural networks (QNNs), when used as squeezing-based field sensors. For all models, we consider a standard metrological sequence consisting of coherent-spin preparation, one-axis-twisting dynamics, field encoding via a weak rotation, time-reversal, and collective readout. We show that a single quantum perceptron generates the same optimal sensitivity as a QRC, but in the perturbative regime it benefits from accelerated squeezing due to steering by the output qubit. Stacking perceptrons into a QNN further amplifies this effect: in a 2-layer QNN with N_in input and N_out output qubits, the optimal squeezing time is reduced by a factor of N_out, while the achievable phase sensitivity remains Heisenberg-limited, Delta phi ~ 1/(N_in + N_out). Moreover, if the layers are used sequentially, first using the outputs to squeeze the inputs and then the inputs to squeeze the outputs, the two contributions to the response add constructively. This yields a sqrt(2) enhancement in sensitivity over a QRC when N_in = N_out and requires shorter total squeezing time. Generalizing to L layers, we show that the metrological gain scales as sqrt(L) while the required squeezing time decreases as 1/N_l, where N_l is the number of qubits per layer. Our results demonstrate that the structure of quantum neural networks can be exploited not only for computation, but also to engineer faster and more sensitive squeezing-based quantum sensors.

Related papers

Efficient Deployment of Spiking Neural Networks on SpiNNaker2 for DVS Gesture Recognition Using Neuromorphic Intermediate Representation [2.649410674489787]
Spiking Neural Networks (SNNs) are highly energy-efficient during inference.<n>Their ability to process event-driven inputs, such as data from dynamic vision sensors (DVS), further enhances their applicability to edge computing tasks.<n>We present the first benchmark for the DVS gesture recognition task using SNNs optimized for the many-core neuromorphic chip SpiNNaker2.
arXiv Detail & Related papers (2025-04-09T10:09:29Z)
Extending Quantum Perceptrons: Rydberg Devices, Multi-Class Classification, and Error Tolerance [67.77677387243135]
Quantum Neuromorphic Computing (QNC) merges quantum computation with neural computation to create scalable, noise-resilient algorithms for quantum machine learning (QML) At the core of QNC is the quantum perceptron (QP), which leverages the analog dynamics of interacting qubits to enable universal quantum computation.
arXiv Detail & Related papers (2024-11-13T23:56:20Z)
Fourier Neural Operators for Learning Dynamics in Quantum Spin Systems [77.88054335119074]
We use FNOs to model the evolution of random quantum spin systems. We apply FNOs to a compact set of Hamiltonian observables instead of the entire $2n$ quantum wavefunction.
arXiv Detail & Related papers (2024-09-05T07:18:09Z)
Physics-informed neural network for quantum control of NMR registers [0.0]
We present an experimental demonstration of quantum control using a physics-informed neural network (PINN) PINN's salient feature is how it encodes the entire control sequence in terms of its network parameters. We discuss two important quantum information tasks: gate synthesis and state preparation.
arXiv Detail & Related papers (2024-06-29T13:56:31Z)
A Quantum Optical Recurrent Neural Network for Online Processing of Quantum Times Series [0.7087237546722617]
We show that a quantum optical recurrent neural network (QORNN) can enhance the transmission rate of quantum channels. We also show that our model can counteract similar memory effects if they are unwanted. We run a small-scale version of this last task on the photonic processor Borealis.
arXiv Detail & Related papers (2023-05-31T19:19:25Z)
Variational Quantum Neural Networks (VQNNS) in Image Classification [0.0]
This paper investigates how training of quantum neural network (QNNs) can be done using quantum optimization algorithms. In this paper, a QNN structure is made where a variational parameterized circuit is incorporated as an input layer named as Variational Quantum Neural Network (VQNNs) VQNNs is experimented with MNIST digit recognition (less complex) and crack image classification datasets which converge the computation in lesser time than QNN with decent training accuracy.
arXiv Detail & Related papers (2023-03-10T11:24:32Z)
Towards Neural Variational Monte Carlo That Scales Linearly with System Size [67.09349921751341]
Quantum many-body problems are central to demystifying some exotic quantum phenomena, e.g., high-temperature superconductors. The combination of neural networks (NN) for representing quantum states, and the Variational Monte Carlo (VMC) algorithm, has been shown to be a promising method for solving such problems. We propose a NN architecture called Vector-Quantized Neural Quantum States (VQ-NQS) that utilizes vector-quantization techniques to leverage redundancies in the local-energy calculations of the VMC algorithm.
arXiv Detail & Related papers (2022-12-21T19:00:04Z)
Toward Trainability of Deep Quantum Neural Networks [87.04438831673063]
Quantum Neural Networks (QNNs) with random structures have poor trainability due to the exponentially vanishing gradient as the circuit depth and the qubit number increase. We provide the first viable solution to the vanishing gradient problem for deep QNNs with theoretical guarantees.
arXiv Detail & Related papers (2021-12-30T10:27:08Z)
A quantum algorithm for training wide and deep classical neural networks [72.2614468437919]
We show that conditions amenable to classical trainability via gradient descent coincide with those necessary for efficiently solving quantum linear systems. We numerically demonstrate that the MNIST image dataset satisfies such conditions. We provide empirical evidence for $O(log n)$ training of a convolutional neural network with pooling.
arXiv Detail & Related papers (2021-07-19T23:41:03Z)
Toward Trainability of Quantum Neural Networks [87.04438831673063]
Quantum Neural Networks (QNNs) have been proposed as generalizations of classical neural networks to achieve the quantum speed-up. Serious bottlenecks exist for training QNNs due to the vanishing with gradient rate exponential to the input qubit number. We show that QNNs with tree tensor and step controlled structures for the application of binary classification. Simulations show faster convergent rates and better accuracy compared to QNNs with random structures.
arXiv Detail & Related papers (2020-11-12T08:32:04Z)
On the learnability of quantum neural networks [132.1981461292324]
We consider the learnability of the quantum neural network (QNN) built on the variational hybrid quantum-classical scheme. We show that if a concept can be efficiently learned by QNN, then it can also be effectively learned by QNN even with gate noise.
arXiv Detail & Related papers (2020-07-24T06:34:34Z)
Recurrent Quantum Neural Networks [7.6146285961466]
Recurrent neural networks are the foundation of many sequence-to-sequence models in machine learning. We construct a quantum recurrent neural network (QRNN) with demonstrable performance on non-trivial tasks. We evaluate the QRNN on MNIST classification, both by feeding the QRNN each image pixel-by-pixel; and by utilising modern data augmentation as preprocessing step.
arXiv Detail & Related papers (2020-06-25T17:59:44Z)

This list is automatically generated from the titles and abstracts of the papers in this site.