Local null controllability of a class of non-Newtonian incompressible viscous fluids

IF 1.3 4区 数学 Q1 MATHEMATICS
P. P. Carvalho, J. Límaco, Denilson Menezes, Yuri Thamsten
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引用次数: 1

Abstract

We investigate the null controllability property of systems that mathematically describe the dynamics of some non-Newtonian incompressible viscous flows. The principal model we study was proposed by O. A. Ladyzhenskaya, although the techniques we develop here apply to other fluids having a shear-dependent viscosity. Taking advantage of the Pontryagin Minimum Principle, we utilize a bootstrapping argument to prove that sufficiently smooth controls to the forced linearized Stokes problem exist, as long as the initial data in turn has enough regularity. From there, we extend the result to the nonlinear problem. As a byproduct, we devise a quasi-Newton algorithm to compute the states and a control, which we prove to converge in an appropriate sense. We finish the work with some numerical experiments.
一类非牛顿不可压缩粘性流体的局部零可控性
我们研究了数学上描述一些非牛顿不可压缩粘性流动动力学的系统的零可控性。我们研究的主要模型是由O. a . Ladyzhenskaya提出的,尽管我们在这里开发的技术适用于具有剪切依赖粘度的其他流体。利用庞特里亚金最小原理,我们利用自启动论证来证明对强制线性化Stokes问题存在足够光滑的控制,只要初始数据反过来具有足够的规律性。由此,我们将结果推广到非线性问题。作为副产品,我们设计了一个准牛顿算法来计算状态和控制,我们证明了它在适当的意义上是收敛的。我们用一些数值实验来完成这项工作。
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来源期刊
Evolution Equations and Control Theory
Evolution Equations and Control Theory MATHEMATICS, APPLIED-MATHEMATICS
CiteScore
3.10
自引率
6.70%
发文量
5
期刊介绍: EECT is primarily devoted to papers on analysis and control of infinite dimensional systems with emphasis on applications to PDE''s and FDEs. Topics include: * Modeling of physical systems as infinite-dimensional processes * Direct problems such as existence, regularity and well-posedness * Stability, long-time behavior and associated dynamical attractors * Indirect problems such as exact controllability, reachability theory and inverse problems * Optimization - including shape optimization - optimal control, game theory and calculus of variations * Well-posedness, stability and control of coupled systems with an interface. Free boundary problems and problems with moving interface(s) * Applications of the theory to physics, chemistry, engineering, economics, medicine and biology
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