Nonexistence and multiplicity of solutions to elliptic problems with supercritical exponents

Abstract

We consider the supercritical problem - u = |u|p-2u in , u=0 on ∂, where is a bounded smooth domain in RN, N≥3, and p≥2*:= 2N/(N-2). Bahri and Coron showed that if has nontrivial homology this problem has a positive solution for p=2*. However, this is not enough to guarantee existence in the supercritical case. For p≥ 2(N-1)/(N-3) Passaseo exhibited domains carrying one nontrivial homology class in which no nontrivial solution exists. Here we give examples of domains whose homology becomes richer as p increases. More precisely, we show that for p> 2(N-k)/(N-k-2) with 1≤ k≤ N-3 there are bounded smooth domains in RN whose cup-length is k+1 in which this problem does not have a nontrivial solution. For N=4,8,16 we show that there are many domains, arising from the Hopf fibrations, in which the problem has a prescribed number of solutions for some particular supercritical exponents.