Classification of the Solutions of Semilinear Elliptic Problems in a Ball

Ž . Ž . decays to zero near ϱ provided H t t dt -ϱ, where t s max p x . Fur-0 < x <st thermore, they show that this condition on p is nearly optimal.

We discuss the existence of multiple solutions of nonlinear elliptic equations by a combination of variational, topological methods and the generalized Conley index theory. We obtain several positive solutions and sign-changing solutions. Our main point is to show the usefulness of the Morse inequal

## Dedicated to Professor Kyuya Masuda on the occasion of his 70th birthday The purpose of this paper is to study a class of semilinear elliptic boundary value problems with degenerate boundary conditions which include as particular cases the Dirichlet problem and the Robin problem. The approach h

## One-dimensionality of Solutions of Semilinear Elliptic Problems in Cylindrical Domains Let w be a bounded domain in R nÀI with smooth boundary, a > H; u AE P R, and let u P C I Àa; a  " w satisfy Àrgjruj jruj ÀI ru fx

The singular semilinear elliptic equation ⌬ u q p x f u s 0 is shown to have a n Ž . unique positive classical solution in R that decays to zero at provided f is a non-increasing continuously differentiable function on 0, ϱ . It is also shown that the equation has a unique weak H 1 -solution on a b