基于张量序列格式的随机微分方程驱动的出口时间反馈控制问题的逼近策略迭代

K. Fackeldey, M. Oster, Leon Sallandt, R. Schneider
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引用次数: 12

摘要

考虑一个随机最优退出时间反馈控制问题。利用策略迭代算法在多项式ansatz空间上用一系列线性方程近似求解Bellman方程。由于需要使用高次多多项式,因此即使在中等维数下,相应的方程也会受到维数诅咒的困扰。我们采用张量训练方法来解释这个问题。策略迭代中的近似过程通过最小二乘方差分析完成,积分通过蒙特卡罗方法完成。给出了(多维)双井电位和三孔电位的数值证据。
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Approximative Policy Iteration for Exit Time Feedback Control Problems Driven by Stochastic Differential Equations using Tensor Train Format
We consider a stochastic optimal exit time feedback control problem. The Bellman equation is solved approximatively via the Policy Iteration algorithm on a polynomial ansatz space by a sequence of linear equations. As high degree multi-polynomials are needed, the corresponding equations suffer from the curse of dimensionality even in moderate dimensions. We employ tensor-train methods to account for this problem. The approximation process within the Policy Iteration is done via a Least-Squares ansatz and the integration is done via Monte-Carlo methods. Numerical evidences are given for the (multi dimensional) double well potential and a three-hole potential.
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