Local solution of Carrier's equation in a noncylindrical domain.

Rabello, Tania Nunes; de Campos Vieira, Maria Cristina

Displaying similar documents to “Local solution of Carrier's equation in a noncylindrical domain.”

Kirchhoff-Carrier elastic strings in noncylindrical domains.

Limaco Ferrel, J., Medeiros, L.A. (1999)

Portugaliae Mathematica

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Remarks on nonlinear biharmonic evolution equation of Kirchhoff type in noncylindrical domain.

Límaco, J., Clark, H.R., Medeiros, L.A. (2003)

International Journal of Mathematics and Mathematical Sciences

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Global existence and uniform stabilization of a nonlinear Timoshenko beam.

Ammari, Kais (2002)

Portugaliae Mathematica. Nova Série

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Multiscale convergence and reiterated homogenization of parabolic problems

Anders Holmbom, Nils Svanstedt, Niklas Wellander (2005)

Applications of Mathematics

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Reiterated homogenization is studied for divergence structure parabolic problems of the form $\partial u_{ε} / \partial t - div (a (x, x / ε, x / ε^{2}, t, t / ε^{k}) \nabla u_{ε}) = f$ . It is shown that under standard assumptions on the function $a (x, y_{1}, y_{2}, t, τ)$ the sequence ${u_{ϵ}}$ of solutions converges weakly in $L^{2} (0, T; H_{0}^{1} (Ω))$ to the solution $u$ of the homogenized problem $\partial u / \partial t - div (b (x, t) \nabla u) = f$ .

Stabilization of Berger–Timoshenko’s equation as limit of the uniform stabilization of the von Kármán system of beams and plates

G. Perla Menzala, Ademir F. Pazoto, Enrique Zuazua (2002)

ESAIM: Mathematical Modelling and Numerical Analysis - Modélisation Mathématique et Analyse Numérique

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We consider a dynamical one-dimensional nonlinear von Kármán model for beams depending on a parameter $ε > 0$ and study its asymptotic behavior for $t$ large, as $ε \to 0$ . Introducing appropriate damping mechanisms we show that the energy of solutions of the corresponding damped models decay exponentially uniformly with respect to the parameter $ε$ . In order for this to be true the damping mechanism has to have the appropriate scale with respect to $ε$ . In the limit as $ε \to 0$ we obtain damped Berger–Timoshenko...

Weak solutions to a nonlinear variational wave equation and some related problems

Ping Zhang (2006)

Applications of Mathematics

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In this paper we present some results on the global existence of weak solutions to a nonlinear variational wave equation and some related problems. We first introduce the main tools, the $L^{p}$ Young measure theory and related compactness results, in the first section. Then we use the $L^{p}$ Young measure theory to prove the global existence of dissipative weak solutions to the asymptotic equation of the nonlinear wave equation, and comment on its relation to Camassa-Holm equations in the second...

Weak solutions to a nonlinear variational wave equation with general data

Ping Zhang, Yuxi Zheng (2005)

Annales de l'I.H.P. Analyse non linéaire

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