Nonexistence of solutions for Dirichlet problems with supercritical growth in tubular domains

Abstract

We deal with Dirichlet problems of the form u+f(u)=0 in , u=0\ on ∂ where is a bounded domain of Rn, n 3, and f has supercritical growth from the viewpoint of Sobolev embedding. In particular, we consider the case where is a tubular domain T(k) with thickness >0 and centre k, a k-dimensional, smooth, compact submanifold of Rn. Our main result concerns the case where k=1 and k is contractible in itself. In this case we prove that the problem does not have nontrivial solutions for >0 small enough. When k 2 or k is noncontractible in itself we obtain weaker nonexistence results. Some examples show that all these results are sharp for what concerns the assumptions on k and f.