Fuerzas activando en un sólido = fuerza de cuerpo + fuerzas de contacto.Donde las fuerzas de contacto pueden ser entendidas como fuerzas internas.

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In this notes we shall study the exponential decay for the semilinear wave equation with potential and locally distributed damping, using the unique continuation principle, result studied by Ruíz [9] applied to problems of asymptotic behavior by Zuazua [10].

In therse notes we will study the decay velocity of the energy of the hyperbolic systems solutions with dissipative contour conditions.

In the system (*), with Neumann boundary conditions and locally distributed dissipation; where a (x) ≥ a0 >0 a.e.in ω, ωΩ neighborhood 0f Γ= ∂Ω which is an open problem, see [6], we study the asymptotic behavior.

In this note we shall study the asymptotic behavior of the wave equation with boundary condition of Newmann type, locally distributed. Using the Principle of the Unique Continuation, result studied by Ruiz (5) and applied to problems of asymptotic behavior by Zuazua (6).

In this paper we study the existence of generalized solutions for a hyperbolic nonlinear system with a discontinuous multi-valued term and nonlinear second-order damping terms on the boundary.

We evalúate the uniform decay of the energy associated with a model semi lineal plates, with dissipation distributed locally, using the principle of continuation single result studied by Ruiz [9] and applied to work with locallydistributed by Zuazua dissipation [10].

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We will study the asymptotic Behavior for a problem of transmission nonlinear with damping locally distributed and with memory at the chosen to boundary for the system following,

In this present work we study the one-dimensional viscoelastic equation defined on the interval [0, L]. We divided the study into two parts: In the first we analyze the existence and uniqueness of solutions using the theory of the linear semigroups, applying in the Abstract Cauchy problem and in the second part we see the exponential stability of the C0-semigroup of contractions associated with linear viscoelastic system.

This article is part of the results of the thesis: Asymptotic behavior for semilinear wave equation with local damping in unbounded domains, in this paper we study the existence and uniqueness of smooth solution for the semilinear wave equation with localized dissipation on Rn given by,

In this work we consider the one-dimensional dynamic model Mindlin- Timoshenko Beam. We will study the existence of soluciones for a contact problem associated with the Mindlin-Timoshenko system. Also analyze how energy decays exponentially to zero as time goes to infinity. The proposed system is as follows…

Estudiamos un problema termoelástica semi-lineal con amortiguación localizado, modelado por...

Fuerzas activando en un sólido = fuerza de cuerpo + fuerzas de contacto.Donde las fuerzas de contacto pueden ser entendidas como fuerzas internas.

No description

Se estudia el decaimiento exponencial de la ecuación de onda semilineal con potencial y amortiguamiento localmente distribuido, empleando el Principio de la Continuación Única, resultado estudiado por Ruiz [9] y aplicado a problemas de comportamientos asintóticos por Zuazua [10].

In therse notes we will study the decay velocity of the energy of the hyperbolic systems solutions with dissipative contour conditions.

In the system (*), with Neumann boundary conditions and locally distributed dissipation; where a (x) ≥ a0 >0 a.e.in ω, ωΩ neighborhood 0f Γ= ∂Ω which is an open problem, see [6], we study the asymptotic behavior.

Se estudia el comportamiento asintótico de la ecuación de onda con condición de frontera del tipo Newmann, localmente distribuido. Empleando el Principio de la Continuación Única, resultado estudiado por Ruíz (5) y aplicado a problemas de comportamiento asintótico por Zuazua (6).