On the Existence of Multiple Positive Solutions for a Semilinear Problem in Exterior Domains

We study the existence of positive radial solutions of \(A u+g(|x|) f(u)=0\) in annuli with Dirichlet (Dirichlet/Neumann) boundary conditions. We prove that the problems have positive radial solutions on any annulus if \(f\) is sublinear at 0 and \(\infty . \quad C 1994\) Academic Press, Inc.

## Abstract We prove the existence of a global strong solution in some class of Marcinkiewicz spaces for the micropolar fluid in an exterior domain of __R__^3^, with initial conditions being a non‐smooth disturbance of a steady solution. We also analyse the large time behaviour of those solutions a

Let ⍀ be a bounded domain with a smooth boundary such that there exists an S 1 group of isometric linear transformations on ⍀. In the present paper, we consider the multiple existence of solutions of the problem where g g C R and h g L ⍀ .

It is proved that the singular semilinear elliptic equation y⌬u s p x g u , Ž . n Ž . 1 ŽŽ . Ž .. lim g s s qϱ, and g g C 0, ϱ , 0, ϱ which is s ª 0 Ž . 2q␣ Ž n . strictly decreasing in 0, ϱ , has a unique positive C R solution that decays to l o c ϱ Ž . Ž . Ž . zero near ϱ provided H t t dt -ϱ, w