English

Near-Optimal Sample Complexity in Reward-Free Kernel-Based Reinforcement Learning

Machine Learning 2025-09-12 v2

Abstract

Reinforcement Learning (RL) problems are being considered under increasingly more complex structures. While tabular and linear models have been thoroughly explored, the analytical study of RL under nonlinear function approximation, especially kernel-based models, has recently gained traction for their strong representational capacity and theoretical tractability. In this context, we examine the question of statistical efficiency in kernel-based RL within the reward-free RL framework, specifically asking: how many samples are required to design a near-optimal policy? Existing work addresses this question under restrictive assumptions about the class of kernel functions. We first explore this question by assuming a generative model, then relax this assumption at the cost of increasing the sample complexity by a factor of H, the length of the episode. We tackle this fundamental problem using a broad class of kernels and a simpler algorithm compared to prior work. Our approach derives new confidence intervals for kernel ridge regression, specific to our RL setting, which may be of broader applicability. We further validate our theoretical findings through simulations.

Keywords

Cite

@article{arxiv.2502.07715,
  title  = {Near-Optimal Sample Complexity in Reward-Free Kernel-Based Reinforcement Learning},
  author = {Aya Kayal and Sattar Vakili and Laura Toni and Alberto Bernacchia},
  journal= {arXiv preprint arXiv:2502.07715},
  year   = {2025}
}

Comments

Accepted at AISTATS 2025

R2 v1 2026-06-28T21:40:30.880Z