English(EN) On Gaussian approximation for entropy-regularized Q-learning with function approximation

新的Q学习方法实现了n^{-1/4}的高斯逼近界

作者 PulseAugur 编辑部 · [2 个来源] · 2026-05-17 22:23

研究人员开发了一种用于函数逼近的熵正则化Q学习中高斯分布逼近的新方法。该研究为异步Q学习生成的平均迭代建立了收敛速率，实现了n^{-1/4}阶的高斯逼近界。这项工作将软贝尔曼递归的线性化与主要鞅项的高斯逼近相结合，还推导了算法最终迭代的高阶矩界。 AI

影响为Q学习算法建立了理论界限，可能提高强化学习应用中的样本效率。

排序理由该集群包含一篇详细介绍机器学习新理论结果的学术论文。

AI 生成摘要 · Google Gemini · 来自 2 个来源。我们如何撰写摘要 →

$新的Q学习方法实现了n^{-1/4}的高斯逼近界$

报道来源 [2]

arXiv stat.ML TIER_1 English(EN) · Artemy Rubtsov, Rahul Singh, Eric Moulines, Alexey Naumov, Sergey Samsonov · 2026-05-19 04:00

On Gaussian approximation for entropy-regularized Q-learning with function approximation

arXiv:2605.17678v1 Announce Type: new Abstract: In this paper, we derive rates of convergence in the high-dimensional central limit theorem for Polyak--Ruppert averaged iterates generated by entropy-regularized asynchronous Q-learning with linear function approximation and a poly…
arXiv stat.ML TIER_1 English(EN) · Sergey Samsonov · 2026-05-17 22:23

On Gaussian approximation for entropy-regularized Q-learning with function approximation

In this paper, we derive rates of convergence in the high-dimensional central limit theorem for Polyak--Ruppert averaged iterates generated by entropy-regularized asynchronous Q-learning with linear function approximation and a polynomial stepsize $k^{-ω}$, $ω\in (1/2,1)$. Assumi…