Trace inequalities of the Sobolev type and nonlinear Dirichlet problems

Abstract

We discuss the solvability of Dirichlet problems of the type - p, w u = σ in ; u = 0 on ∂ , where is a bounded domain in Rn, p, w is a weighted (p, w)-Laplacian and σ is a nonnegative locally finite Radon measure on . We do not assume the finiteness of σ(). We revisit this problem from a potential theoretic perspective and provide criteria for the existence of solutions by Lp(w)-Lq(σ) trace inequalities or capacitary conditions. Additionally, we apply the method to the singular elliptic problem - p, w u = σ u- γ in ; u = 0 on ∂ and derive connection with the trace inequalities.