Renormalized variational principles and Hardy-type inequalities

Abstract

Let ⊂ R2 be a bounded domain on which Hardy's inequality holds. We prove that [(u2)-1]/δ2∈ L1() if u∈ H10(), where δ denotes the distance to ∂. The corresponding higher-dimensional result is also given. These results contain both Hardy's and Trudinger's inequalities, and yield a new variational characterization of the maximal solution of the Liouville equation on smooth domains, in terms of a renormalized functional. A global H1 bound on the difference between the maximal solution and the first term of its asymptotic expansion follows.