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Main Authors: Song, Sum Kyun, Shin, Bong Gyun, Lee, Jae Yong
Format: Preprint
Published: 2026
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Online Access:https://arxiv.org/abs/2605.07323
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author Song, Sum Kyun
Shin, Bong Gyun
Lee, Jae Yong
author_facet Song, Sum Kyun
Shin, Bong Gyun
Lee, Jae Yong
contents Discovering governing differential equations from observational data is a fundamental challenge in scientific machine learning. Existing symbolic regression approaches rely primarily on quantitative metrics; however, real-world differential equation modeling also requires incorporating domain knowledge to ensure physical plausibility. To address this gap, we propose DoLQ, a method for discovering ordinary differential equations with LLM-based qualitative and quantitative evaluation. DoLQ employs a multi-agent architecture: a Sampler Agent proposes dynamic system candidates, a Parameter Optimizer refines equations for accuracy, and a Scientist Agent leverages an LLM to conduct both qualitative and quantitative evaluations and synthesize their results to iteratively guide the search. Experiments on multi-dimensional ordinary differential equation benchmarks demonstrate that DoLQ achieves superior performance compared to existing methods, not only attaining higher success rates but also more accurately recovering the correct symbolic terms of ground truth equations. Our code is available at https://github.com/Bon99yun/DoLQ.
format Preprint
id arxiv_https___arxiv_org_abs_2605_07323
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle Discovering Ordinary Differential Equations with LLM-Based Qualitative and Quantitative Evaluation
Song, Sum Kyun
Shin, Bong Gyun
Lee, Jae Yong
Artificial Intelligence
Machine Learning
Neural and Evolutionary Computing
Symbolic Computation
68T01
Discovering governing differential equations from observational data is a fundamental challenge in scientific machine learning. Existing symbolic regression approaches rely primarily on quantitative metrics; however, real-world differential equation modeling also requires incorporating domain knowledge to ensure physical plausibility. To address this gap, we propose DoLQ, a method for discovering ordinary differential equations with LLM-based qualitative and quantitative evaluation. DoLQ employs a multi-agent architecture: a Sampler Agent proposes dynamic system candidates, a Parameter Optimizer refines equations for accuracy, and a Scientist Agent leverages an LLM to conduct both qualitative and quantitative evaluations and synthesize their results to iteratively guide the search. Experiments on multi-dimensional ordinary differential equation benchmarks demonstrate that DoLQ achieves superior performance compared to existing methods, not only attaining higher success rates but also more accurately recovering the correct symbolic terms of ground truth equations. Our code is available at https://github.com/Bon99yun/DoLQ.
title Discovering Ordinary Differential Equations with LLM-Based Qualitative and Quantitative Evaluation
topic Artificial Intelligence
Machine Learning
Neural and Evolutionary Computing
Symbolic Computation
68T01
url https://arxiv.org/abs/2605.07323