Singular limits in higher order Lioville-type equations

Abstract

In this paper we consider the higher order Lioville-type equation (-)m u=2m V(x) eu in ⊂eqR2m with V≠0 a given smooth potential, ∈R+ a small parameter which tends to zero from above and where we prescribe the boundary conditions to be either Navier or Dirichlet. We find sufficient conditions under which, as approaches 0, there exists an explicit class of solutions which admit a concentration behavior with a prescribed bubble profile around some given k-points in , for any given integer k. These are the so-called singular limits. The candidate k-points of concentration must be critical points of a suitable finite dimensional functional explicitly defined in terms of the potential V and the higher order Green's function with respect to the imposed boundary conditions.