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English(EN) Regret-Based $(ε,δ)$-optimal Stopping Criteria for Bayesian Optimization

新研究推动优化与强化学习理论发展

研究人员开发了用于优化机器学习中决策过程的新理论框架。一篇论文介绍了基于后悔的贝叶斯优化停止准则,确保解以高概率在指定的ε-最优性范围内。另一项研究侧重于多项逻辑MDP的强化学习,提出了一种具有改进的最小极大最优后悔界限的算法。第三篇论文解决了折扣MDP中的风险敏感强化学习问题,在递归熵风险度量下提供了学习最优策略的样本复杂度界限。 AI

影响 这些理论进展可能带来更高效、更鲁棒的AI系统,以应对复杂的决策场景。

排序理由 该集群包含多篇详细阐述机器学习优化和强化学习理论进展的学术论文。

在 arXiv cs.LG 阅读 →

AI 生成摘要 · Google Gemini · 来自 5 个来源。 我们如何撰写摘要 →

新研究推动优化与强化学习理论发展

报道来源 [5]

  1. arXiv cs.LG TIER_1 English(EN) · Haowei Wang, Jingyi Wang, Qiyu Wei ·

    基于后悔的 $(\epsilon,\delta)$-最优停止准则用于贝叶斯优化

    arXiv:2605.22561v1 Announce Type: new Abstract: Bayesian optimization (BO) is a widely used iterative black-box optimization method that utilizes Gaussian process (GP) surrogate models. In practice, BO is typically terminated after a fixed evaluation budget is exhausted, which ca…

  2. arXiv cs.LG TIER_1 English(EN) · Qiyu Wei ·

    基于后悔的 $(ε,δ)$-最优停止准则用于贝叶斯优化

    Bayesian optimization (BO) is a widely used iterative black-box optimization method that utilizes Gaussian process (GP) surrogate models. In practice, BO is typically terminated after a fixed evaluation budget is exhausted, which can incur unnecessary cost and provides no optimal…

  3. arXiv stat.ML TIER_1 English(EN) · Pierre Boudart (SIERRA), Pierre Gaillard (Thoth), Alessandro Rudi (PSL, DI-ENS, Inria) ·

    多项逻辑马尔可夫决策过程的Minimax最优方差感知遗憾界限

    arXiv:2605.19768v1 Announce Type: cross Abstract: We study reinforcement learning for episodic Markov Decision Processes (MDPs) whose transitions are modelled by a multinomial logistic (MNL) model. Existing algorithms for MNL mixture MDPs yield a regret of $\smash{\tilde{O}(dH^2\…

  4. arXiv stat.ML TIER_1 English(EN) · Oliver Mortensen, Mohammad Sadegh Talebi ·

    折扣MDP中的递归熵风险优化:具有生成模型的样本复杂度界限

    arXiv:2506.00286v3 Announce Type: replace-cross Abstract: We study risk-sensitive reinforcement learning in finite discounted MDPs with recursive entropic risk measures (ERM), where the risk parameter $\beta \neq 0$ controls the agent's risk attitude: $\beta>0$ for risk-averse an…

  5. arXiv stat.ML TIER_1 English(EN) · Alessandro Rudi ·

    多项逻辑马尔可夫决策过程的Minimax最优方差感知遗憾界限

    We study reinforcement learning for episodic Markov Decision Processes (MDPs) whose transitions are modelled by a multinomial logistic (MNL) model. Existing algorithms for MNL mixture MDPs yield a regret of $\smash{\tilde{O}(dH^2\sqrt{T})}$ (Li et al., 2024), where $d$ is the fea…