Learning Unstable Continuous-Time Stochastic Linear Control Systems

Reza Sadeghi Hafshejani, Mohamad Kazem Shirani Fradonbeh
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Abstract

We study the problem of system identification for stochastic continuous-time dynamics, based on a single finite-length state trajectory. We present a method for estimating the possibly unstable open-loop matrix by employing properly randomized control inputs. Then, we establish theoretical performance guarantees showing that the estimation error decays with trajectory length, a measure of excitability, and the signal-to-noise ratio, while it grows with dimension. Numerical illustrations that showcase the rates of learning the dynamics, will be provided as well. To perform the theoretical analysis, we develop new technical tools that are of independent interest. That includes non-asymptotic stochastic bounds for highly non-stationary martingales and generalized laws of iterated logarithms, among others.
学习不稳定的连续时间随机线性控制系统
我们研究了基于单个有限长状态轨迹的随机连续时间动力学的系统识别问题。我们提出了一种通过采用适当的随机控制输入来估计可能不稳定的开环矩阵的方法。然后,我们建立了理论性能保证,表明估计误差随轨迹长度、兴奋性度量和信噪比的增加而减小,同时它的增长是渐进的。此外,我们还将提供数字图解,展示学习动力学的速度。为了进行理论分析,我们开发了具有独立意义的新技术工具。其中包括高度非稳态马氏随机边界和迭代对数的广义法则等。
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