Nonlinear boundary stabilization for Timoshenko beam system

This paper is concerned with the existence and decay of solutions of the following Timoshenko system:‖u″−μ(t)Δu+α1∑i=1n∂v∂xi=0,inΩ×(0,∞),v″−Δv−α2∑i=1n∂u∂xi=0,inΩ×(0,∞), subject to the nonlinear boundary conditions:‖u=v=0inΓ0×(0,∞),∂u∂ν+h1(x,u′)=0inΓ1×(0,∞),∂v∂ν+h2(x,v′)+σ(x)u=0inΓ1×(0,∞), and the re...

Full description

Saved in:
Bibliographic Details
Published in:Journal of mathematical analysis and applications 2015-08, Vol.428 (1), p.194-216
Main Authors: Feitosa, A.J.R., Oliveira, M.L., Milla Miranda, M.
Format: Article
Language:English
Subjects:
Boundary stabilization
Galerkin method
Timoshenko beam
Citations: Items that this one cites
Items that cite this one
Online Access:Get full text
Tags: Add Tag
No Tags, Be the first to tag this record!
Description
Summary:This paper is concerned with the existence and decay of solutions of the following Timoshenko system:‖u″−μ(t)Δu+α1∑i=1n∂v∂xi=0,inΩ×(0,∞),v″−Δv−α2∑i=1n∂u∂xi=0,inΩ×(0,∞), subject to the nonlinear boundary conditions:‖u=v=0inΓ0×(0,∞),∂u∂ν+h1(x,u′)=0inΓ1×(0,∞),∂v∂ν+h2(x,v′)+σ(x)u=0inΓ1×(0,∞), and the respective initial conditions at t=0. Here Ω is a bounded open set of Rn with boundary Γ constituted by two disjoint parts Γ0 and Γ1 and ν(x) denotes the exterior unit normal vector at x∈Γ1. The functions hi(x,s)(i=1,2) are continuous and strongly monotone in s∈R. The existence of solutions of the above problem is obtained by applying the Galerkin method with a special basis, the compactness method and a result of approximation of continuous functions by Lipschitz continuous functions due to Strauss. The exponential decay of energy follows by using the multiplier and the Zuazua method.
ISSN:0022-247X
1096-0813
DOI:10.1016/j.jmaa.2015.02.019