Elliptic Schr\"odinger equations with gradient-dependent nonlinearity and Hardy potential singular on manifolds

Abstract

Let ⊂ RN (N ≥ 3) be a C2 bounded domain and ⊂ is a C2 compact boundaryless submanifold in RN of dimension k, 0≤ k < N-2. For μ≤ (N-k-22)2, put Lμ := + μ d-2 where d(x) = dist(x,). We study boundary value problems for equation -Lμ u = g(u,|∇ u|) in , subject to the boundary condition u= on ∂ , where g: R × R+ R+ is a continuous and nondecreasing function with g(0,0)=0, is a given nonnegative measure on ∂ . When g satisfies a so-called subcritical integral condition, we establish an existence result for the problem under a smallness assumption on . If g(u,|∇ u|) = |u|p|∇ u|q, there are ranges of p,q, called subcritical ranges, for which the subcritical integral condition is satisfied, hence the problem admits a solution. Beyond these ranges, where the subcritical integral condition may be violated, we establish various criteria on for the existence of a solution to the problem expressed in terms of appropriate Bessel capacities.