A concentration phenomenon for semilinear elliptic equations

Abstract

For a domain ⊂N we consider the equation - u + V(x)u = Qn(x)up-2u with zero Dirichlet boundary conditions and p∈(2,2*). Here V 0 and Qn are bounded functions that are positive in a region contained in and negative outside, and such that the sets \Qn>0\ shrink to a point x0∈ as n∞. We show that if un is a nontrivial solution corresponding to Qn, then the sequence (un) concentrates at x0 with respect to the H1 and certain Lq-norms. We also show that if the sets \Qn>0\ shrink to two points and un are ground state solutions, then they concentrate at one of these points.