Title of article
Godunov-type approximation for a general resonant balance law with large data
Author/Authors
Amadori، Debora نويسنده , , Gosse، Laurent نويسنده , , Guerra، Graziano نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2004
Pages
-232
From page
233
To page
0
Abstract
Dynamic von Karman equations with a nonlinear boundary dissipation are considered. Questions related to long time behaviour, existence and structure of global attractors are studied. It is shown that a nonlinear boundary dissipation with a large damping parameter leads to an existence of global (compact) attractor for all weak (finite energy) solutions. This result has been known in the case of full interior dissipation, but it is new in the case when the boundary damping is the main dissipative mechanism in the system. In addition, we prove that fractal dimension of the attractor is finite. The proofs depend critically on the infinite speed of propagation associated with the von Karman model considered.
Keywords
Balance laws , Nonstrict hyperbolicity , Nonconservative (NC) products , Well-balanced (WB) Godunov scheme
Journal title
JOURNAL OF DIFFERENTIAL EQUATIONS
Serial Year
2004
Journal title
JOURNAL OF DIFFERENTIAL EQUATIONS
Record number
119134
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