Finite Interpolation in Green Function Deterministic Numerical Methods

A method for refracti¨e index adapti¨e gridding in finitedifference time-domain methods is presented. This method allows highly efficient simulation of structures consisting of homogeneous regions with large differences in refracti¨e index and planar interfaces, which are frequently encountered when

## Abstract The displacement‐based formulation of the method of finite spheres is observed to exhibit volumetric ‘locking’ when incompressible or nearly incompressible deformations are encountered. In this paper, we present a displacement/pressure mixed formulation as a solution to this problem. We

## Abstract Projection, or conjugate gradient like, methods are becoming increasingly popular for the efficient solution of large sparse sets of unsymmetric indefinite equations arising from the numerical integration of (initial) boundary value problems. One such problem is soil consolidation coupl

Finite element methods are used to solve a coupled system of nonlinear partial differential equations, which models incompressible miscible displacement in porous media. Through a backward finite difference discretization in time, we define a sequentially implicit time-stepping algorithm that uncoup