2019
DOI: 10.3934/dcds.2019012
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Cauchy problem for the Kuznetsov equation

Abstract: We consider the Cauchy problem for a model of non-linear acoustic, named the Kuznetsov equation, describing a sound propagation in thermo-viscous elastic media. For the viscous case, it is a weakly quasi-linear strongly damped wave equation, for which we prove the global existence in time of regular solutions for sufficiently small initial data, the size of which is specified, and give the corresponding energy estimates. In the inviscid case, we update the known results of John for quasi-linear wave equations,… Show more

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Cited by 20 publications
(49 citation statements)
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“…Proof. The existence of u and u has already been shown in [11] and given in Theorem 4.1. The proof of the approximation estimate follows exactly the proof of Theorem 2.2 and hence it is omitted.…”
Section: Derivation Of the Westervelt Equation From The Kuznetsov Equmentioning
confidence: 71%
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“…Proof. The existence of u and u has already been shown in [11] and given in Theorem 4.1. The proof of the approximation estimate follows exactly the proof of Theorem 2.2 and hence it is omitted.…”
Section: Derivation Of the Westervelt Equation From The Kuznetsov Equmentioning
confidence: 71%
“…We subtract the Kuznetsov equation from the approximated Kuznetsov equation (see system (27)), multiply by (u − u) t and integrate over Ω to obtain, as in Ref. [11], the following stability estimate:…”
Section: 22mentioning
confidence: 99%
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