An Enhanced Levenberg--Marquardt Method via Gram Reduction

Authors

  • Chengchang Liu Department of Computer Science and Engineering, The Chinese University of Hong Kong
  • Luo Luo Fudan University Shanghai Key Laboratory for Contemporary Applied Mathematics
  • John C.S. Lui Department of Computer Science and Engineering, The Chinese University of Hong Kong

DOI:

https://doi.org/10.1609/aaai.v39i18.34066

Abstract

This paper studies the problem of solving the system of nonlinear equations. We propose the Gram-reduced Levenberg--Marquardt method, which reuses the Gram matrix. Our method has a global convergence guarantee without relying on any step of line-search or solving sub-problems. We show that our method takes a smaller computational complexity than existing Levenberg--Marquardt methods to find the stationary point of the square norm of the equations. We also show that the proposed method enjoys a local superlinear convergence rate under the non-degenerate assumption. Experiments are conducted on real-world applications in scientific computing and machine learning, which validate the efficiency of our method.
AAAI-25 / IAAI-25 / EAAI-25 Proceedings Cover

Downloads

Published

2025-04-11

How to Cite

Liu, C., Luo, L., & Lui, J. C. (2025). An Enhanced Levenberg--Marquardt Method via Gram Reduction. Proceedings of the AAAI Conference on Artificial Intelligence, 39(18), 18772–18779. https://doi.org/10.1609/aaai.v39i18.34066

Issue

Vol. 39 No. 18: AAAI-25 Technical Tracks 18

Section

AAAI Technical Track on Machine Learning IV