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Main Authors: Avdonin, Sergei, Edward, Julian, Ivanov, Sergei
Format: Preprint
Published: 2024
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Online Access:https://arxiv.org/abs/2401.14987
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author Avdonin, Sergei
Edward, Julian
Ivanov, Sergei
author_facet Avdonin, Sergei
Edward, Julian
Ivanov, Sergei
contents Let $Δ$ be the Dirichlet Laplacian on the interval $(0,π)$. The null controllability properties of the equation $$u_{tt}+Δ^2 u+ρ(Δ)^αu_t=F(x,t)$$ are studied. Let $T>0$, and assume initial conditions $(u^0,u^1)\in Dom(Δ)\times L^2(0,π)$. We first prove finite dimensional null control results: suppose $F(x,t)=f^1(t)h^1(x)+f^2(t)h^2(x)$ with $h^1,h^2$ given functions. For $α\in [0,3/2)$, we prove that there exist $h^1,h^2\in L^2(0,π)$ such that for any $(u^0,u^1)$, there exist $L^2$ null controls $(f^1,f^2).$ For $α< 1$ and $ρ<2$, we prove null controllability with $f^2=0$ and $h^1$ belonging to a large class of functions. For $α\in [3/2,2)$, we prove spectral and null controllability both generally fail, but two dimensional weak controllability holds. Our second set of results pertains to $F(x,t)=χ_Ω(x)f(x,t)$, with $Ω$ any open subset of $(0,π)$. For any $α\in [0,3/2),$ we prove there exists a null control $f\in L^2(Ω\times(0,T))$ To prove our main results, we use the Fourier method to rewrite the control problems as moment problems. These are then solved by constructing biorthogonal sets to the associated exponential families. These constructions seem to be non-standard and may be of independent interest.
format Preprint
id arxiv_https___arxiv_org_abs_2401_14987
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Null-controllability for the beam equation with structural damping. Part 1. Distributed control
Avdonin, Sergei
Edward, Julian
Ivanov, Sergei
Optimization and Control
93C20, 93B05
Let $Δ$ be the Dirichlet Laplacian on the interval $(0,π)$. The null controllability properties of the equation $$u_{tt}+Δ^2 u+ρ(Δ)^αu_t=F(x,t)$$ are studied. Let $T>0$, and assume initial conditions $(u^0,u^1)\in Dom(Δ)\times L^2(0,π)$. We first prove finite dimensional null control results: suppose $F(x,t)=f^1(t)h^1(x)+f^2(t)h^2(x)$ with $h^1,h^2$ given functions. For $α\in [0,3/2)$, we prove that there exist $h^1,h^2\in L^2(0,π)$ such that for any $(u^0,u^1)$, there exist $L^2$ null controls $(f^1,f^2).$ For $α< 1$ and $ρ<2$, we prove null controllability with $f^2=0$ and $h^1$ belonging to a large class of functions. For $α\in [3/2,2)$, we prove spectral and null controllability both generally fail, but two dimensional weak controllability holds. Our second set of results pertains to $F(x,t)=χ_Ω(x)f(x,t)$, with $Ω$ any open subset of $(0,π)$. For any $α\in [0,3/2),$ we prove there exists a null control $f\in L^2(Ω\times(0,T))$ To prove our main results, we use the Fourier method to rewrite the control problems as moment problems. These are then solved by constructing biorthogonal sets to the associated exponential families. These constructions seem to be non-standard and may be of independent interest.
title Null-controllability for the beam equation with structural damping. Part 1. Distributed control
topic Optimization and Control
93C20, 93B05
url https://arxiv.org/abs/2401.14987