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Optimal Boundary Control for Equations of Nonlinear
Acoustics
Christian Clason∗ Barbara Kaltenbacher† Irena Lasiecka‡
Slobodan Veljovic§
Abstract
Motivated by a medical application from lithotripsy, we study an optimal boundarycontrol problem given by Westervelt equation
− 1
c2D2
tu+ ∆u+b
c2∆(Dtu) = − βa
ρc4D2
tu2 in (0, T )× Ω (1)
modeling the nonlinear evolution of the acoustic pressure u in a smooth, bounded domainΩ ⊂ Rd, d ∈ 1, 2, 3. Here c > 0 is the speed of sound, b > 0 the diffusivity ofsound, ρ > 0 the mass density and βa > 1 the parameter of nonlinearity. We studythe optimization problem for existence of an optimal control and derive the first-ordernecessary optimality conditions.
In addition, all results are extended for the more general Kuznetsov equation
D2tψ − c2∆ψ = Dt
„b∆ψ +
1
c2B
2A(Dtψ)2 + |∇ψ|2
«(2)
given in terms of the acoustic velocity potential ψ.
Key words. optimal control, existence, nonlinear wave equation
∗Institute for Mathematics and Scientific Computing, University of Graz, Heinrichstrasse 36, A-8010 Graz,Austria, ([email protected])†Institute for Mathematics and Scientific Computing, University of Graz, Heinrichstrasse 36, A-8010 Graz,
Austria, ([email protected]).‡Department of Mathematics, University of Virginia, Charlottesville, VA 22903, USA,
([email protected]).§Institute for Mathematics and Scientific Computing, University of Graz, Heinrichstrasse 36, A-8010 Graz,
Austria, Fax: +43 316 380-9815, ([email protected]).
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978-1-4244-7827-9/10/$26.00 ©2010 IEEE 143
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