Guaranteed phase synchronization of hybrid oscillators using symbolic Euler's method (verification challenge)

The Archivist Pub Date : 2020-07-12 DOI:10.29007/l3k2
J. Jerray, L. Fribourg, É. André
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Abstract

The phenomenon of phase synchronization was evidenced in the 17th century by Huy- gens while observing two pendulums of clocks leaning against the same wall. This phe- nomenon has more recently appeared as a widespread phenomenon in nature, and turns out to have multiple industrial applications. The exact parameter values of the system for which the phenomenon manifests itself are however delicate to obtain in general, and it is interesting to find formal sufficient conditions to guarantee phase synchronization. Using the notion of reachability, we give here such a formal method. More precisely, our method selects a portion S of the state space, and shows that any solution starting at S returns to S within a fixed number of periods k. Besides, our method shows that the components of the solution are then (almost) in phase. We explain how the method applies on the Brusselator reaction-diffusion and the biped walker examples. These examples can also be seen as “challenges” for the verification of continuous and hybrid systems.
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基于符号欧拉法的混合振子相位保证同步(验证挑战)
相位同步现象在17世纪由Huy-gens在观察靠在同一面墙上的两个钟摆时证明。这种现象最近在自然界中广泛出现,并在工业上有多种应用。然而,现象本身所表现的系统的确切参数值通常很难获得,并且找到保证相位同步的形式充分条件是令人感兴趣的。利用可达性的概念,我们给出了这样一个形式化的方法。更准确地说,我们的方法选择了状态空间的一部分S,并表明任何从S开始的解在固定数量的周期k内返回到S。此外,我们的算法表明,解的分量然后(几乎)同相。我们解释了该方法如何应用于Brusselator反应扩散和两足步行者的例子。这些例子也可以被视为连续和混合系统验证的“挑战”。
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