Increasing regularity of generalized solutions to the wave equation for computing optimal boundary controls

Authors

  • D.A. Ivanov Lomonosov Moscow State University

DOI:

https://doi.org/10.26089/NumMet.v17r328

Keywords:

wave equation, generalized solution, boundary control, subcritical interval, approximate data, approximate solution, convergence

Abstract

Problems with two-sided boundary controls of three main types are considered for the wave equation in the classes of weak generalized solutions on intervals of subcritical length. An algorithm is proposed for the stable approximation of boundary controls. This algorithm is based on the preliminary smoothing of phase trajectories, the application of a variational method in the classes of strong generalized solutions, and the final differentiation of the resulting smoothed controls. Numerical results are discussed.

Author Biography

D.A. Ivanov

References

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  2. D. A. Ivanov and M. M. Potapov, “Continuous Invertibility of a Boundary Control Operator for the Wave Equation on Subcritical Intervals in Classes of Weak Generalized Solutions,” Vestn. Mosk. Univ., Ser. 15: Vychisl. Mat. Kibern., No. 4, 5-12 (2014) [Moscow Univ. Comput. Math. Cybern. 38 (4), 139-146 (2014)].
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Published

25-07-2016

How to Cite

Иванов Д. Increasing Regularity of Generalized Solutions to the Wave Equation for Computing Optimal Boundary Controls // Numerical Methods and Programming (Vychislitel’nye Metody i Programmirovanie). 2016. 17. 299-308. doi 10.26089/NumMet.v17r328

Issue

Section

Section 1. Numerical methods and applications