A Nonlinear elliptic PDE with curve singularity on the boundary

Abstract

Let be a bounded domain of RN+1 (N ≥ 3) with smooth boundary ∂ and be a closed submanifold contained on ∂ and containing 0. We are interesting in the existence of positive H1()-solution of the following Hardy-Sobolev trace type equation equation* cases - u+u=0 & in \\\\ ∂ u∂ = -s uqs-1 & on ∂ , cases equation* where is the unit outer normal of ∂ , : ∂ R is the distance function in ∂ to the curve : (x):= ∈fy ∈ dg(x, y) and for 0≤ s <1, qs:=2(N-s)N-1 is the critical Hardy-Sobolev exponent. The existence of solution may depend on the local geometry of the boundary ∂ and at 0 or in the shapes of the domain and its boundary ∂ .

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