On vibrating thin membranes with mass concentrated near the boundary: an asymptotic analysis

Abstract

We consider the spectral problem equation* \arrayll - u=λ()u & in\ \\ ∂ u∂=0 & on\ ∂ array. equation* in a smooth bounded domain of R2. The factor which appears in the first equation plays the role of a mass density and it is equal to a constant of order -1 in an -neighborhood of the boundary and to a constant of order in the rest of . We study the asymptotic behavior of the eigenvalues λ() and the eigenfunctions u as tends to zero. We obtain explicit formulas for the first and second terms of the corresponding asymptotic expansions by exploiting the solutions of certain auxiliary boundary value problems.