Acoustic wave guides as infinite-dimensional dynamical systems

Acoustic wave guides as infinite-dimensional dynamical systems

We prove the unique solvability, passivity/conservativity and some regularity results of two mathematical models for acoustic wave propagation in curved, variable diameter tubular structures of finite length. The first of the models is the generalised Webster’s model that includes dissipation and cu...

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Veröffentlicht in:ESAIM. Control, optimisation and calculus of variations optimisation and calculus of variations, 2015-04, Vol.21 (2), p.324-347
Hauptverfasser: Aalto, Atte, Lukkari, Teemu, Malinen, Jarmo
Format: Artikel
Sprache:eng
Schlagworte:
35L05
35L20
47N70
93C20
Acoustic propagation
Acoustic waves
Curvature
Mathematical models
passivity
regularity
Three dimensional models
tubular domain
wave equation
Wave equations
Wave propagation
Waveguides
Webster’s horn model
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Beschreibung
Zusammenfassung:We prove the unique solvability, passivity/conservativity and some regularity results of two mathematical models for acoustic wave propagation in curved, variable diameter tubular structures of finite length. The first of the models is the generalised Webster’s model that includes dissipation and curvature of the 1D waveguide. The second model is the scattering passive, boundary controlled wave equation on 3D waveguides. The two models are treated in an unified fashion so that the results on the wave equation reduce to the corresponding results of approximating Webster’s model at the limit of vanishing waveguide intersection.
ISSN:1292-8119
1262-3377
DOI:10.1051/cocv/2014019