Anderson localization problem: An exact solution for 2-D anisotropic systems

In this paper, the elastic-perfectly plastic antiplane problem of a crack in anisotropic plane of finite width is studied. Using the methods of Rice and Lekhnitskii, an exact solution in closed form is obtained.

## Abstract This work is a generalization of the immersed interface method for discretization of a nondiagonal anisotropic Laplacian in 2D. This first‐order discretization scheme enforces weakly diagonal dominance of the numerical scheme whenever possible. A necessary and sufficient condition depen

In this paper we develop and test an exponentially fitted finite volume method for the numerical solution of the Navier-Stokes equations describing \(2 D\) incompressible flows. The method is based on an Imsttuctured Delatmay mesh and its dhal Dischlet tessollation, comlined with a locally constant

## Abstract We shall derive some global existence results to semilinear wave equations with a damping coefficient localized near infinity for very special initial data in __H__×__L__^2^. This problem is dealt with in the two‐dimensional exterior domain with a star‐shaped complement. In our result,