Existence for wave equations on domains with arbitrary growing cracks

Existence for wave equations on domains with arbitrary growing cracks

In this paper we formulate and study scalar wave equations on domains with arbitrary growing cracks. This includes a zero Neumann condition on the crack sets, and the only assumptions on these sets are that they have bounded surface measure and are growing in the sense of set inclusion. In particula...

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Veröffentlicht in:Atti della Accademia nazionale dei Lincei. Rendiconti Lincei. Matematica e applicazioni 2011-01, Vol.22 (3), p.387-408
Hauptverfasser: Dal Maso, Gianni, Larsen, Christopher
Format: Artikel
Sprache:eng
Schlagworte:
Mechanics of deformable solids
Partial differential equations
Real functions
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Zusammenfassung:In this paper we formulate and study scalar wave equations on domains with arbitrary growing cracks. This includes a zero Neumann condition on the crack sets, and the only assumptions on these sets are that they have bounded surface measure and are growing in the sense of set inclusion. In particular, they may be dense, so the weak formulations must fall outside of the usual weak formulations using Sobolev spaces. We study both damped and undamped equations, showing existence and, for the damped equation, uniqueness and energy conservation.
ISSN:1120-6330
1720-0768
DOI:10.4171/RLM/606