Some Results on Neural Network Stability, Consistency, and Convergence: Insights into Non-IID Data, High-Dimensional Settings, and Physics-Informed Neural Networks

Ronald Katende, Henry Kasumba, Godwin Kakuba, John M. Mango
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Abstract

This paper addresses critical challenges in machine learning, particularly the stability, consistency, and convergence of neural networks under non-IID data, distribution shifts, and high-dimensional settings. We provide new theoretical results on uniform stability for neural networks with dynamic learning rates in non-convex settings. Further, we establish consistency bounds for federated learning models in non-Euclidean spaces, accounting for distribution shifts and curvature effects. For Physics-Informed Neural Networks (PINNs), we derive stability, consistency, and convergence guarantees for solving Partial Differential Equations (PDEs) in noisy environments. These results fill significant gaps in understanding model behavior in complex, non-ideal conditions, paving the way for more robust and reliable machine learning applications.
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关于神经网络稳定性、一致性和收敛性的一些结果:对非 IID 数据、高维设置和物理信息神经网络的启示
本文探讨了机器学习中的关键挑战,特别是神经网络在非 IID 数据、分布偏移和高维设置下的稳定性、一致性和收敛性。我们提供了在非凸环境下具有动态学习率的神经网络均匀稳定性的新理论结果。此外,我们还为非欧几里得空间中的联合学习模型建立了一致性边界,并考虑了分布偏移和曲率效应。对于物理信息神经网络(PINNs),我们推导出了在噪声环境中求解偏微分方程(PDEs)的稳定性、一致性和收敛性保证。这些成果填补了在理解复杂、非理想条件下模型行为方面的重大空白,为更稳健、更可靠的机器学习应用铺平了道路。
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