Concentrating solutions for an anisotropic planar elliptic Neumann problem with Hardy-H\'enon weight and large exponent

Abstract

Let be a bounded domain in R2 with smooth boundary, we study the following anisotropic elliptic Neumann problem with Hardy-H\'enon weight cases -∇(a(x)∇ u)+a(x)u=a(x)|x-q|2αup,\,\,\,\, u>0\,\,\,\,\, in\,\,\,\,\, ,\\[2mm] ∂ u∂=0\,\, \,\ \ \,\,\,\, on\,\,\, ∂, cases where denotes the outer unit normal vector to ∂, q∈, α∈(-1,+∞), p>1 is a large exponent and a(x) is a positive smooth function. We investigate the effect of the interaction between anisotropic coefficient a(x) and singular source q on the existence of concentrating solutions. We show that if q∈ is a strict local maximum point of a(x), there exists a family of positive solutions with arbitrarily many interior spikes accumulating to q; while if q∈∂ is a strict local maximum point of a(x) and satisfies ∇ a(q),\,(q)=0, such a problem has a family of positive solutions with arbitrarily many mixed interior and boundary spikes accumulating to q. In particular, we find that concentration at singular source q is always possible whether q∈ is an isolated local maximum point of a(x) or not.