Abstract :
Let Ω be a bounded domain in Rn, n 3, with the boundary ∂Ω C3. We consider the following singularly perturbed nonlinear elliptic problem on Ω where ν is an exterior normal to ∂Ω and a nonlinearity f of subcritical growth. Under rather strong conditions on f, it has been known that for small ε>0, there exists a solution uε of the above problem which exhibits a spike layer near local maximum points of the mean curvature H on ∂Ω as ε→0. In this paper, we obtain the same result under some conditions on f (Berestycki–Lions conditions), which we believe to be almost optimal.
