An existence theorem for a singular quasilinear elliptic boundary value problem with boundary blow-up

By using an artiÿcial boundary an iteration method is designed to solve some elliptic boundary value problems with singularities. At each step of the iteration the standard ÿnite element method is used to solve the problems in a domain without singularities. It is shown that the iteration method is

## Abstract We consider a singular anisotropic quasilinear problem with Dirichlet boundary condition and we establish two sufficient conditions for the uniqueness of the solution, provided such a solution exists. The proofs use elementary tools and they are based on a general comparison lemma combi

It is proved that the singular third-order boundary value problem ym = f(y), y(0) = 0, y(+o¢) = 1, y~(+oo) = yU(+cc) = 0, has a unique solution. Here f(y) = (1 -y)~g(y), )~ > O, g(y) is positive and continuous on (0, 1]. The problem arises in the study of draining and coating flows.