2003
Orlando Avila-Pozos and Alexander B. Movchan Slow decay of end effects in layered structures with an imperfect interface Journal of Engineering Mathematics Volume 45, Number 2, 155-168, DOI: 10.1023/A:1022125917959
Abstract
An asymptotic analysis of a layered structure with an imperfect interface subject to an anti-plane shear deformation and non-homogeneous Dirichlet end conditions is presented in this paper. Two layers of isotropic materials are bonded via a middle interface layer (adhesive joint), which is thin and soft; effectively, this can be described as a discontinuity surface for the displacement. Model fields are constructed to compensate for the error produced by the asymptotic solution for the case when the layered structure is subject to non-homogeneous Dirichlet end conditions. Numerical examples and analytical estimates are presented to illustrate the slow decay of the boundary-layer fields.
Quasi-periodic breathers in Hamiltonian networks of long-range coupling
CONTINUOUS AND DISCRETE FLOWS ON OPERATOR ALGEBRAS
Eigenvalues, K-theory and Minimal Flows
PROPAGATION OF ELASTIC WAVES ALONG INTERFACES IN LAYERED BEAMS
Eigenfunction expansions and spectral projections for isotropic elasticity outside an obstacle
Matematicas en la distribucion espacial de poblaciones
D-Branes in Orientifolds and Orbifolds and Kasparov KK-Theory
Una Conjetura de Polya y Szego para el Tono Fundamental de Membranas Poligonales
Propagation of Elastic Waves along Interfaces in Layered Beams