A thick-point approximation of a small body embedded in an elastic medium: justification with an asymptotic analysis.

A fully transient analysis of an embedded spherical shell in an elastic medium using exact, 3D elasticity theory for the shell, with all possible sources excitation including

La seconde (p. 308), vue comme ”limite” continue de l’approche DEM (Discrete Equation Method), conduit, pour un choix de solveur acoustique (eq. 308) assez similaires, pour P i ,

The modeling of the kinetics of the precipitation dissolution reaction and the diffusive transport is presented in Section 2 below; the model is written at the representative

= 0.25): graph of the total energy Etot versus the position z2 of the second particle, for different values of the pinning strength Ap a) Ap = 0.06 < Athri under the threshold

Both versions reduce to the coherent potential approximation for the case of a disordered alloy, and to known results for the case of a random liquid metal, but are

To this end, we develop a multiphysics algorithm that couples Multipoint Flux Mixed Finite Element (MFMFE) methods for the fluid, both in the medium and in the crack, with

1 Formulation of the Problem and Buckling Study A nonhomogeneous cylindrical structure composed of a thin shell inserted in a surrounding elastic medium was subjected to a state

In order to apply the results of [8,4] in the context of approximation it is important to assess the gap between the performance of the sparsest approximation model under the