Boundary trace of positive solutions of semilinear elliptic equations in Lipschitz domains

Abstract

We study the generalized boundary value problem for nonnegative solutions of - u+g(u)=0 in a bounded Lipschitz domain , when g is continuous and nondecreasing. Using the harmonic measure of , we define a trace in the class of outer regular Borel measures. We amphasize the case where g(u)=|u|q-1u, q>1. When is (locally) a cone with vertex y, we prove sharp results of removability and characterization of singular behavior. In the general case, assuming that possesses a tangent cone at every boundary point and q is subcritical, we prove an existence and uniqueness result for positive solutions with arbitrary boundary trace. We obtain sharp results involving Besov spaces with negative index on k-dimensional edges and apply our results to the characterization of removable sets and good measures on the boundary of a polyhedron.