Langevin Monte Carlo Beyond Lipschitz Gradient Continuity

Authors

  • Matej Benko Brno University of Technology
  • Iwona Chlebicka University of Warsaw
  • Jorgen Endal Norwegian University of Science and Technology
  • Błażej Miasojedow University of Warsaw

DOI:

https://doi.org/10.1609/aaai.v39i15.33706

Abstract

We present a significant advancement in the field of Langevin Monte Carlo (LMC) methods by introducing the Inexact Proximal Langevin Algorithm (IPLA). This novel algorithm broadens the scope of problems that LMC can effectively address while maintaining controlled computational costs. IPLA extends LMC's applicability to potentials that are convex, strongly convex in the tails, and exhibit polynomial growth, beyond the conventional L-smoothness assumption. Moreover, we extend LMC's applicability to super-quadratic potentials and offer improved convergence rates over existing algorithms. Additionally, we provide bounds on all moments of the Markov chain generated by IPLA, enhancing its analytical robustness.
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Published

2025-04-11

How to Cite

Benko, M., Chlebicka, I., Endal, J., & Miasojedow, B. (2025). Langevin Monte Carlo Beyond Lipschitz Gradient Continuity. Proceedings of the AAAI Conference on Artificial Intelligence, 39(15), 15541–15549. https://doi.org/10.1609/aaai.v39i15.33706

Issue

Vol. 39 No. 15: AAAI-25 Technical Tracks 15

Section

AAAI Technical Track on Machine Learning I