Deficiency of equation-finding approach to data-driven modeling of dynamical systems
- URL: http://arxiv.org/abs/2509.03769v1
- Date: Wed, 03 Sep 2025 23:30:26 GMT
- Title: Deficiency of equation-finding approach to data-driven modeling of dynamical systems
- Authors: Zheng-Meng Zhai, Valerio Lucarini, Ying-Cheng Lai,
- Abstract summary: We show that for many chaotic systems, sparse-optimization methods for discovering governing equations produce models that depend sensitively on the measurement procedure.<n>Finding the governing equations of the system and attempting to interpret them physically may lead to misleading conclusions.
- Score: 0.0
- License: http://creativecommons.org/licenses/by-nc-nd/4.0/
- Abstract: Finding the governing equations from data by sparse optimization has become a popular approach to deterministic modeling of dynamical systems. Considering the physical situations where the data can be imperfect due to disturbances and measurement errors, we show that for many chaotic systems, widely used sparse-optimization methods for discovering governing equations produce models that depend sensitively on the measurement procedure, yet all such models generate virtually identical chaotic attractors, leading to a striking limitation that challenges the conventional notion of equation-based modeling in complex dynamical systems. Calculating the Koopman spectra, we find that the different sets of equations agree in their large eigenvalues and the differences begin to appear when the eigenvalues are smaller than an equation-dependent threshold. The results suggest that finding the governing equations of the system and attempting to interpret them physically may lead to misleading conclusions. It would be more useful to work directly with the available data using, e.g., machine-learning methods.
Related papers
- Disordered Dynamics in High Dimensions: Connections to Random Matrices and Machine Learning [52.26396748560348]
We provide an overview of high dimensional dynamical systems driven by random matrices.<n>We focus on applications to simple models of learning and generalization in machine learning theory.
arXiv Detail & Related papers (2026-01-03T00:12:32Z) - SODAs: Sparse Optimization for the Discovery of Differential and Algebraic Equations [0.0]
We introduce Sparse Optimization for Differential-Algebraic Systems (SODAs)<n>SODAs is a data-driven method for the identification of DAEs in their explicit form.<n>We demonstrate its robustness to noise in both simulated time series and real-time experimental data.
arXiv Detail & Related papers (2025-03-08T00:29:00Z) - No Equations Needed: Learning System Dynamics Without Relying on Closed-Form ODEs [56.78271181959529]
This paper proposes a conceptual shift to modeling low-dimensional dynamical systems by departing from the traditional two-step modeling process.<n>Instead of first discovering a closed-form equation and then analyzing it, our approach, direct semantic modeling, predicts the semantic representation of the dynamical system.<n>Our approach not only simplifies the modeling pipeline but also enhances the transparency and flexibility of the resulting models.
arXiv Detail & Related papers (2025-01-30T18:36:48Z) - Reconstruction of dynamic systems using genetic algorithms with dynamic search limits [0.0]
evolutionary computing techniques are presented to estimate the governing equations of a dynamical system using time-series data.<n>Some of the main contributions of the present study are an adequate modification of the genetic algorithm to remove terms with minimal contributions, and a mechanism to escape local optima.<n>Our results demonstrate a reconstruction with an Integral Square Error below 0.22 and a coefficient of determination R-squared of 0.99 for all systems.
arXiv Detail & Related papers (2024-12-03T22:58:25Z) - Deep Generative Modeling for Identification of Noisy, Non-Stationary Dynamical Systems [3.1484174280822845]
We focus on finding parsimonious ordinary differential equation (ODE) models for nonlinear, noisy, and non-autonomous dynamical systems.
Our method, dynamic SINDy, combines variational inference with SINDy (sparse identification of nonlinear dynamics) to model time-varying coefficients of sparse ODEs.
arXiv Detail & Related papers (2024-10-02T23:00:00Z) - D-CIPHER: Discovery of Closed-form Partial Differential Equations [80.46395274587098]
We propose D-CIPHER, which is robust to measurement artifacts and can uncover a new and very general class of differential equations.
We further design a novel optimization procedure, CoLLie, to help D-CIPHER search through this class efficiently.
arXiv Detail & Related papers (2022-06-21T17:59:20Z) - Discrepancy Modeling Framework: Learning missing physics, modeling
systematic residuals, and disambiguating between deterministic and random
effects [4.459306403129608]
In modern dynamical systems, discrepancies between model and measurement can lead to poor quantification.
We introduce a discrepancy modeling framework to identify the missing physics and resolve the model-measurement mismatch.
arXiv Detail & Related papers (2022-03-10T05:37:24Z) - Capturing Actionable Dynamics with Structured Latent Ordinary
Differential Equations [68.62843292346813]
We propose a structured latent ODE model that captures system input variations within its latent representation.
Building on a static variable specification, our model learns factors of variation for each input to the system, thus separating the effects of the system inputs in the latent space.
arXiv Detail & Related papers (2022-02-25T20:00:56Z) - A Priori Denoising Strategies for Sparse Identification of Nonlinear
Dynamical Systems: A Comparative Study [68.8204255655161]
We investigate and compare the performance of several local and global smoothing techniques to a priori denoise the state measurements.
We show that, in general, global methods, which use the entire measurement data set, outperform local methods, which employ a neighboring data subset around a local point.
arXiv Detail & Related papers (2022-01-29T23:31:25Z) - Discovery of Nonlinear Dynamical Systems using a Runge-Kutta Inspired
Dictionary-based Sparse Regression Approach [9.36739413306697]
We blend machine learning and dictionary-based learning with numerical analysis tools to discover governing differential equations.
We obtain interpretable and parsimonious models which are prone to generalize better beyond the sampling regime.
We discuss its extension to governing equations, containing rational nonlinearities that typically appear in biological networks.
arXiv Detail & Related papers (2021-05-11T08:46:51Z) - Using Data Assimilation to Train a Hybrid Forecast System that Combines
Machine-Learning and Knowledge-Based Components [52.77024349608834]
We consider the problem of data-assisted forecasting of chaotic dynamical systems when the available data is noisy partial measurements.
We show that by using partial measurements of the state of the dynamical system, we can train a machine learning model to improve predictions made by an imperfect knowledge-based model.
arXiv Detail & Related papers (2021-02-15T19:56:48Z)
This list is automatically generated from the titles and abstracts of the papers in this site.
This site does not guarantee the quality of this site (including all information) and is not responsible for any consequences.