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Bibliographic Details
Main Authors: lliopoulos, Athanasios P., Lunasin, Evelyn, Michopoulos, John G., Rodriguez, Steven N., Wiggins, Stephen
Format: Preprint
Published: 2024
Subjects:
Online Access:https://arxiv.org/abs/2411.10910
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author lliopoulos, Athanasios P.
Lunasin, Evelyn
Michopoulos, John G.
Rodriguez, Steven N.
Wiggins, Stephen
author_facet lliopoulos, Athanasios P.
Lunasin, Evelyn
Michopoulos, John G.
Rodriguez, Steven N.
Wiggins, Stephen
contents This study presents a method, along with its algorithmic and computational framework implementation, and performance verification for dynamical system identification. The approach incorporates insights from phase space structures, such as attractors and their basins. By understanding these structures, we have improved training and testing strategies for operator learning and system identification. Our method uses time delay and non-linear maps rather than embeddings, enabling the assessment of algorithmic accuracy and expressibility, particularly in systems exhibiting multiple attractors. This method, along with its associated algorithm and computational framework, offers broad applicability across various scientific and engineering domains, providing a useful tool for data-driven characterization of systems with complex nonlinear system dynamics.
format Preprint
id arxiv_https___arxiv_org_abs_2411_10910
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Data-Driven Model Identification Using Time Delayed Nonlinear Maps for Systems with Multiple Attractors
lliopoulos, Athanasios P.
Lunasin, Evelyn
Michopoulos, John G.
Rodriguez, Steven N.
Wiggins, Stephen
Dynamical Systems
Data Analysis, Statistics and Probability
37M05, 37M10, 93B28, 93B30
This study presents a method, along with its algorithmic and computational framework implementation, and performance verification for dynamical system identification. The approach incorporates insights from phase space structures, such as attractors and their basins. By understanding these structures, we have improved training and testing strategies for operator learning and system identification. Our method uses time delay and non-linear maps rather than embeddings, enabling the assessment of algorithmic accuracy and expressibility, particularly in systems exhibiting multiple attractors. This method, along with its associated algorithm and computational framework, offers broad applicability across various scientific and engineering domains, providing a useful tool for data-driven characterization of systems with complex nonlinear system dynamics.
title Data-Driven Model Identification Using Time Delayed Nonlinear Maps for Systems with Multiple Attractors
topic Dynamical Systems
Data Analysis, Statistics and Probability
37M05, 37M10, 93B28, 93B30
url https://arxiv.org/abs/2411.10910