Nonlinear Stability of Bifurcating Front Solutions for the Taylor-Couette Problem

The Method of Fundamental Solution (also known as the F-Trefftz method or the singularity method) is an efficient numerical method for the solution of Laplace equation for both two-and three-dimensional problems. In recent years, the method has also been applied for the solution of Poisson equations

In this paper we consider a nonlinear parabolic problem with a discontinuous, nonmonotone nonlinearity. We assume the existence of an upper solution and a lower solution such that F . Using results from the theory of pseudomonotone operators and from the theory of multivalued analysis together with

In 1940 S. M. Ulam proposed at the University of Wisconsin the problem: ''Give conditions in order for a linear mapping near an approximately linear mapping to exist.'' In 1968 S. U. Ulam proposed the more general problem: ''When is it true that by changing a little the hypotheses of a theorem one c

Discrete geometric conservation laws (DGCLs) govern the geometric parameters of numerical schemes designed for the solution of unsteady flow problems on moving grids. A DGCL requires that these geometric parameters, which include among others grid positions and velocities, be computed so that the co