Two dimensional analysis of coupled non-Fick diffusion-elastodynamics problems in functionally graded materials using meshless local Petrov-Galerkin (MLPG) method

In this article, the transient dynamic analysis of two dimensional coupled non-Fick diffusionelasticity is carried out in functionally graded materials (FGMs) under shock loading using meshless local Petrov–Galerkin (MLPG) method. By using a unit step function as the test functions on small subdomains of circular shape in the local weak-form, the local integral equations (LIEs) are obtained for the problem. The mechanical properties are assumed to vary as nonlinear functions in volume fraction forms. The radial basis functions are used for approximation of the spatial variation of field variables in the analyzed domain. For treatment of time variations, the Laplace-transform technique is utilized. The molar concentration and elastic wave propagate with finite speeds through 2D-FGM domain. The effects of various grading patterns of FGMs on the propagation of molar concentration and elastic waves are discussed in details at various time instants. The profiles of molar concentration and displacements in two orthogonal directions are illustrated in FGM with various nonlinear grading patterns at various time instants. The presented results show that the MLPGmethod has a high capability to be employed for transient and wave propagation analysis in coupled problem of elasticity and diffusion. © 2015 Elsevier Inc. All rights reserved.