Bilinear Optimal Control of an Advection-Reaction-Diffusion System

IF 10.8 1区 数学 Q1 MATHEMATICS, APPLIED
SIAM Review Pub Date : 2021-01-07 DOI:10.1137/21m1389778
R. Glowinski, Yongcun Song, Xiaoming Yuan, Hangrui Yue
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引用次数: 10

Abstract

We consider the bilinear optimal control of an advection-reaction-diffusion system, where the control arises as the velocity field in the advection term. Such a problem is generally challenging from both theoretical analysis and algorithmic design perspectives mainly because the state variable depends nonlinearly on the control variable and an additional divergence-free constraint on the control is coupled together with the state equation. Mathematically, the proof of the existence of optimal solutions is delicate, and up to now, only some results are known for a few special cases where additional restrictions are imposed on the space dimension and the regularity of the control. We prove the existence of optimal controls and derive the first-order optimality conditions in general settings without any extra assumption. Computationally, the well-known conjugate gradient (CG) method can be applied conceptually. However, due to the additional divergence-free constraint on the control variable and the nonlinear relation between the state and control variables, it is challenging to compute the gradient and the optimal stepsize at each CG iteration, and thus nontrivial to implement the CG method. To address these issues, we advocate a fast inner preconditioned CG method to ensure the divergence-free constraint and an efficient inexactness strategy to determine an appropriate stepsize. An easily implementable nested CG method is thus proposed for solving such a complicated problem. For the numerical discretization, we combine finite difference methods for the time discretization and finite element methods for the space discretization. Efficiency of the proposed nested CG method is promisingly validated by the results of some preliminary numerical experiments.
平流-反应-扩散系统的双线性最优控制
研究了一类平流-反应-扩散系统的双线性最优控制问题,其中控制是平流项中的速度场。从理论分析和算法设计的角度来看,这样的问题通常具有挑战性,主要是因为状态变量非线性地依赖于控制变量,并且对控制的额外无散度约束与状态方程耦合在一起。在数学上,最优解的存在性的证明是很微妙的,到目前为止,只有少数特殊情况下的一些结果是已知的,这些情况对空间维度和控制的规律性施加了额外的限制。我们证明了最优控制的存在性,并导出了一般情况下的一阶最优性条件。在计算上,众所周知的共轭梯度法(CG)可以在概念上应用。然而,由于控制变量的无散度约束和状态与控制变量之间的非线性关系,在每次迭代时计算梯度和最优步长是一个挑战,因此实现CG方法是不平凡的。为了解决这些问题,我们提出了一种快速的内预置CG方法来确保无发散约束,并提出了一种有效的不精确策略来确定适当的步长。因此,提出了一种易于实现的嵌套CG方法来解决这一复杂问题。对于数值离散化,我们将时间离散化的有限差分法和空间离散化的有限元法相结合。初步数值实验结果表明,该方法的有效性得到了很好的验证。
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来源期刊
SIAM Review
SIAM Review 数学-应用数学
CiteScore
16.90
自引率
0.00%
发文量
50
期刊介绍: Survey and Review feature papers that provide an integrative and current viewpoint on important topics in applied or computational mathematics and scientific computing. These papers aim to offer a comprehensive perspective on the subject matter. Research Spotlights publish concise research papers in applied and computational mathematics that are of interest to a wide range of readers in SIAM Review. The papers in this section present innovative ideas that are clearly explained and motivated. They stand out from regular publications in specific SIAM journals due to their accessibility and potential for widespread and long-lasting influence.
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