cff-version: 1.2.0 abstract: "

### Research Objective


The primary objective of this research is to enhance the generalization of physics-informed machine learning (PIML) models by integrating them with neural oscillators. The goal is to improve the accuracy of these models in predicting solutions to partial differential equations (PDEs) beyond the training domain.


### Type of Research


This research is applied and experimental. It focuses on developing and validating a new methodological approach to enhance the generalization capabilities of PIML models through a series of numerical experiments on various nonlinear and high order PDEs.


### Method of Data Collection


The data used for validating numerical experiments are closed form analytic solution and physics-informed method is utilized to simulate the dataset. Both are explicitly mention in the python notebooks. The experiments are conducted on time-dependent nonlinear PDEs, including the viscous Burgers equation, Allen-Cahn equation, nonlinear Schrödinger equation, Euler-Bernoulli beam equation, and a 2D Kovasznay flow.


### Type of Data/codes


1. All implementation are done using jupyter notebooks (.ipynb) or .py.

2. .mat files are analytical solution generated using PINN simulation.

3. (.jpeg), (.pdf) are figures which are used in the main manuscript.


" authors: - family-names: Kapoor given-names: Taniya orcid: "https://orcid.org/0000-0002-6361-446X" title: "Data and code underlying the publication: Neural oscillators for generalization of physics-informed machine learning" keywords: version: 1 identifiers: - type: doi value: 10.4121/da6fadb7-843b-4c86-a231-884d88e64868.v1 license: CC BY 4.0 date-released: 2024-06-05