Semilinear elliptic equations with Hardy potential and gradient nonlinearity

Abstract

Let ⊂ RN (N ≥ 3) be a C2 bounded domain and δ be the distance to ∂ . We study positive solutions of equation (E) -Lμ u+ g(|∇ u|) = 0 in where Lμ= + μδ2 , μ ∈ (0,14] and g is a continuous, nondecreasing function on R+. We prove that if g satisfies a singular integral condition then there exists a unique solution of (E) with a prescribed boundary datum . When g(t)=tq with q ∈ (1,2), we show that equation (E) admits a critical exponent qμ (depending only on N and μ). In the subcritical case, namely 1<q<qμ, we establish some a priori estimates and provide a description of solutions with an isolated singularity on ∂ . In the supercritical case, i.e. qμ≤ q<2, we demonstrate a removability result in terms of Bessel capacities.