Related papers: Neutron Reflectometry by Gradient Descent

Neutron Reflectometry by Gradient Descent

URL: http://arxiv.org/abs/2509.06924v1
Date: Mon, 08 Sep 2025 17:38:01 GMT
Title: Neutron Reflectometry by Gradient Descent
Authors: Max D. ~Champneys, Andrew J. ~Parnell, Philipp Gutfreund, Maximilian W. A. Skoda, . Patrick A. Fairclough, Timothy J. ~Rogers, Stephanie L. ~Burg,
Abstract summary: Neutron reflectometry (NR) is a powerful technique to probe surfaces and interfaces.<n>This paper presents two benchmark case studies; demonstrating state-of-the-art performance on a thick oxide quartz film, and robust co-fitting performance in the high complexity regime of organic LED multilayer devices.<n>We provide an open-source library of differentiable reflectometry kernels in the python programming language so that gradient based approaches can readily be applied to other NR datasets.
Score: 0.0
License: http://creativecommons.org/licenses/by/4.0/
Abstract: Neutron reflectometry (NR) is a powerful technique to probe surfaces and interfaces. NR is inherently an indirect measurement technique, access to the physical quantities of interest (layer thickness, scattering length density, roughness), necessitate the solution of an inverse modelling problem, that is inefficient for large amounts of data or complex multiplayer structures (e.g. lithium batteries / electrodes). Recently, surrogate machine learning models have been proposed as an alternative to existing optimisation routines. Although such approaches have been successful, physical intuition is lost when replacing governing equations with fast neural networks. Instead, we propose a novel and efficient approach; to optimise reflectivity data analysis by performing gradient descent on the forward reflection model itself. Herein, automatic differentiation techniques are used to evaluate exact gradients of the error function with respect to the parameters of interest. Access to these quantities enables users of neutron reflectometry to harness a host of powerful modern optimisation and inference techniques that remain thus far unexploited in the context of neutron reflectometry. This paper presents two benchmark case studies; demonstrating state-of-the-art performance on a thick oxide quartz film, and robust co-fitting performance in the high complexity regime of organic LED multilayer devices. Additionally, we provide an open-source library of differentiable reflectometry kernels in the python programming language so that gradient based approaches can readily be applied to other NR datasets.

Related papers

Multi-Dimensional Visual Data Recovery: Scale-Aware Tensor Modeling and Accelerated Randomized Computation [51.65236537605077]
We propose a new type of network compression optimization technique, fully randomized tensor network compression (FCTN)<n>FCTN has significant advantages in correlation characterization and transpositional in algebra, and has notable achievements in multi-dimensional data processing and analysis.<n>We derive efficient algorithms with guarantees to solve the formulated models.
arXiv Detail & Related papers (2026-02-13T14:56:37Z)
Parallel Diffusion Solver via Residual Dirichlet Policy Optimization [88.7827307535107]
Diffusion models (DMs) have achieved state-of-the-art generative performance but suffer from high sampling latency due to their sequential denoising nature.<n>Existing solver-based acceleration methods often face significant image quality degradation under a low-dimensional budget.<n>We propose the Ensemble Parallel Direction solver (dubbed as EPD-EPr), a novel ODE solver that mitigates these errors by incorporating multiple gradient parallel evaluations in each step.
arXiv Detail & Related papers (2025-12-28T05:48:55Z)
Gradient Descent as a Perceptron Algorithm: Understanding Dynamics and Implicit Acceleration [67.12978375116599]
We show that the steps of gradient descent (GD) reduce to those of generalized perceptron algorithms.<n>This helps explain the optimization dynamics and the implicit acceleration phenomenon observed in neural networks.
arXiv Detail & Related papers (2025-12-12T14:16:35Z)
Topolow: Force-Directed Euclidean Embedding of Dissimilarity Data with Robustness Against Non-Metricity and Sparsity [0.8287206589886881]
Topolow is a physics-inspired, gradient-free optimization framework for such embedding problems.<n>Topolow does not require the input dissimilarities to be metric, making it a robust solution for embedding non-metric measurements into a valid Euclidean space.<n>This paper formalizes the algorithm, first introduced as Topolow in the context of antigenic mapping in (Arhami and Rohani, 2025)
arXiv Detail & Related papers (2025-08-03T12:19:17Z)
GratNet: A Photorealistic Neural Shader for Diffractive Surfaces [0.0]
We present a multi-layer perceptron (MLP) based method for data-driven rendering of diffractive surfaces with high accuracy and efficiency.<n>We demonstrate the high-quality reconstruction of the ground-truth using Peak-Signal-to-Noise (PSNR), Structural Similarity Index Measure (SSIM) and a flipping difference evaluator (FLIP) as evaluation metrics.
arXiv Detail & Related papers (2025-06-18T18:58:00Z)
KO: Kinetics-inspired Neural Optimizer with PDE Simulation Approaches [45.173398806932376]
This paper introduces KO, a novel neural gradient inspired by kinetic theory and partial differential equation (PDE) simulations.<n>We reimagine the dynamics of network parameters as the evolution of a particle system governed by kinetic principles.<n>This physics-driven approach inherently promotes parameter diversity during optimization, mitigating the phenomenon of parameter condensation.
arXiv Detail & Related papers (2025-05-20T18:00:01Z)
Model-Based Reparameterization Policy Gradient Methods: Theory and Practical Algorithms [88.74308282658133]
Reization (RP) Policy Gradient Methods (PGMs) have been widely adopted for continuous control tasks in robotics and computer graphics. Recent studies have revealed that, when applied to long-term reinforcement learning problems, model-based RP PGMs may experience chaotic and non-smooth optimization landscapes. We propose a spectral normalization method to mitigate the exploding variance issue caused by long model unrolls.
arXiv Detail & Related papers (2023-10-30T18:43:21Z)
Parallel and Limited Data Voice Conversion Using Stochastic Variational Deep Kernel Learning [2.5782420501870296]
This paper proposes a voice conversion method that works with limited data. It is based on variational deep kernel learning (SVDKL) It is possible to estimate non-smooth and more complex functions.
arXiv Detail & Related papers (2023-09-08T16:32:47Z)
A Deep Unrolling Model with Hybrid Optimization Structure for Hyperspectral Image Deconvolution [50.13564338607482]
We propose a novel optimization framework for the hyperspectral deconvolution problem, called DeepMix.<n>It consists of three distinct modules, namely, a data consistency module, a module that enforces the effect of the handcrafted regularizers, and a denoising module.<n>This work proposes a context aware denoising module designed to sustain the advancements achieved by the cooperative efforts of the other modules.
arXiv Detail & Related papers (2023-06-10T08:25:16Z)
Capturing dynamical correlations using implicit neural representations [85.66456606776552]
We develop an artificial intelligence framework which combines a neural network trained to mimic simulated data from a model Hamiltonian with automatic differentiation to recover unknown parameters from experimental data. In doing so, we illustrate the ability to build and train a differentiable model only once, which then can be applied in real-time to multi-dimensional scattering data.
arXiv Detail & Related papers (2023-04-08T07:55:36Z)
Physics-Informed Neural Networks for Material Model Calibration from Full-Field Displacement Data [0.0]
We propose PINNs for the calibration of models from full-field displacement and global force data in a realistic regime. We demonstrate that the enhanced PINNs are capable of identifying material parameters from both experimental one-dimensional data and synthetic full-field displacement data.
arXiv Detail & Related papers (2022-12-15T11:01:32Z)
Deep Gaussian Processes for Biogeophysical Parameter Retrieval and Model Inversion [14.097477944789484]
This paper introduces the use of deep Gaussian Processes (DGPs) for bio-geo-physical model inversion. Unlike shallow GP models, DGPs account for complicated (modular, hierarchical) processes, provide an efficient solution that scales well to big datasets.
arXiv Detail & Related papers (2021-04-16T10:42:01Z)
Large-scale Neural Solvers for Partial Differential Equations [48.7576911714538]
Solving partial differential equations (PDE) is an indispensable part of many branches of science as many processes can be modelled in terms of PDEs. Recent numerical solvers require manual discretization of the underlying equation as well as sophisticated, tailored code for distributed computing. We examine the applicability of continuous, mesh-free neural solvers for partial differential equations, physics-informed neural networks (PINNs) We discuss the accuracy of GatedPINN with respect to analytical solutions -- as well as state-of-the-art numerical solvers, such as spectral solvers.
arXiv Detail & Related papers (2020-09-08T13:26:51Z)
Multipole Graph Neural Operator for Parametric Partial Differential Equations [57.90284928158383]
One of the main challenges in using deep learning-based methods for simulating physical systems is formulating physics-based data. We propose a novel multi-level graph neural network framework that captures interaction at all ranges with only linear complexity. Experiments confirm our multi-graph network learns discretization-invariant solution operators to PDEs and can be evaluated in linear time.
arXiv Detail & Related papers (2020-06-16T21:56:22Z)

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