Nonexistence of solutions for elliptic equations with supercritical nonlinearity in nearly nontrivial domains

Abstract

We deals with nonlinear elliptic Dirichlet problems of the form div(|D u|p-2D u )+f(u)=0 in , u∈ H1,p0() where is a bounded domain in Rn, n 2, p> 1 and f has supercritical growth from the viewpoint of Sobolev embedding. Our aim is to show that there exist bounded contractible non star-shaped domains , arbitrarily close to domains with nontrivial topology, such that the problem does not have nontrivial solutions. For example, we prove that if n=2, 1<p<2, f(u)=|u|q-2u with q>2p 2-p and =\(θ,θ)\ :\ |θ|<α,\ | -1|<s\ with 0<α<π and 0<s<1, then for all q>2p 2-p there exists s>0 such that the problem has only the trivial solution u 0 for all α∈ (0,π) and s∈ (0, s).