Measure boundary value problem for semilinear elliptic equations with critical Hardy potentials

Abstract

Let ⊂N be a bounded C2 domain and =--d2 the Hardy operator where d= (.,) and 0<≤14. Let =11-4 be the two Hardy exponents, the first eigenvalue of with corresponding positive eigenfunction φ. If g is a continuous nondecreasing function satisfying ∫1∞(g(s)+|g(-s)|)s-22N-2++2N-4++ds<∞, then for any Radon measures ∈ φ() and ∈ () there exists a unique weak solution to problem P,: u+g(u)= in , u= on . If g(r)=|r|q-1u (q>1) we prove that, in the subcritical range of q, a necessary and sufficient condition for solving P0, with >0 is that is absolutely continuous with respect to the capacity associated to the Besov space B2-2++2q',q'(N-1). We also characterize the boundary removable sets in terms of this capacity. In the subcritical range of q we classify the isolated singularities of positive solutions.