双时标准随机逼近的马尔可夫基础扩展版

Caio Kalil Lauand, Sean Meyn
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引用次数: 0

摘要

许多机器学习和优化算法都可以看作是随机逼近(SA)的实例。众所周知,这些算法的收敛速度很慢,最佳均方误差(MSE)为 $O(n^{-1})。之前的研究表明,通过准随机逼近(QSA)框架,可以实现接近 $O(n^{-4})$的 MSE 值;QSA 本质上是在谨慎选择确定性探索的情况下实现的 SA。这些结果被扩展到两种时间尺度的算法,如强化学习和极值寻优控制的策略梯度法。这些扩展部分得益于一种新的分析方法,它允许将双时间尺度算法解释为单时间尺度 QSA 的实例,QSA 的负 Lyapunov 指数理论使之成为可能。该一般理论在极值寻优控制(ESC)中的应用也说明了这一点。
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Markovian Foundations for Quasi-Stochastic Approximation in Two Timescales: Extended Version
Many machine learning and optimization algorithms can be cast as instances of stochastic approximation (SA). The convergence rate of these algorithms is known to be slow, with the optimal mean squared error (MSE) of order $O(n^{-1})$. In prior work it was shown that MSE bounds approaching $O(n^{-4})$ can be achieved through the framework of quasi-stochastic approximation (QSA); essentially SA with careful choice of deterministic exploration. These results are extended to two time-scale algorithms, as found in policy gradient methods of reinforcement learning and extremum seeking control. The extensions are made possible in part by a new approach to analysis, allowing for the interpretation of two timescale algorithms as instances of single timescale QSA, made possible by the theory of negative Lyapunov exponents for QSA. The general theory is illustrated with applications to extremum seeking control (ESC).
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