Efficient Learning of Hyperrectangular Invariant Sets Using Gaussian Processes

Michael Enqi Cao;Matthieu Bloch;Samuel Coogan
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引用次数: 3

Abstract

We present a method for efficiently computing reachable sets and forward invariant sets for continuous-time systems with dynamics that include unknown components. Our main assumption is that, given any hyperrectangle of states, lower and upper bounds for the unknown components are available. With this assumption, the theory of mixed monotone systems allows us to formulate an efficient method for computing a hyperrectangular set that over-approximates the reachable set of the system. We then show a related approach that leads to sufficient conditions for identifying hyperrectangular sets that are forward invariant for the dynamics. We additionally show that set estimates tighten as the bounds on the unknown behavior tighten. Finally, we derive a method for satisfying our main assumption by modeling the unknown components as state-dependent Gaussian processes, providing bounds that are correct with high probability. A key benefit of our approach is to enable tractable computations for systems up to moderately high dimension that are subject to low dimensional uncertainty modeled as Gaussian processes, a class of systems that often appears in practice. We demonstrate our results on several examples, including a case study of a planar multirotor aerial vehicle.
利用高斯过程有效学习超矩形不变集
我们提出了一种有效计算连续时间系统的可达集和前向不变集的方法,该系统具有包含未知分量的动力学。我们的主要假设是,给定任何超矩形状态,未知分量的下界和上界都是可用的。有了这个假设,混合单调系统理论允许我们制定一种有效的方法来计算超矩形集,该超矩形集过度逼近系统的可达集。然后,我们展示了一种相关的方法,该方法导致识别对动力学具有前向不变的超矩形集的充分条件。我们还表明,集合估计随着未知行为的边界收紧而收紧。最后,我们推导了一种方法,通过将未知分量建模为状态相关的高斯过程来满足我们的主要假设,提供高概率正确的边界。我们的方法的一个关键好处是,能够对高达适度维度的系统进行易于处理的计算,这些系统受到建模为高斯过程的低维不确定性的影响,高斯过程是一类在实践中经常出现的系统。我们在几个例子中展示了我们的结果,包括一个平面多旋翼飞行器的案例研究。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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