Sobolev inequalities with jointly concave weights on convex cones

Abstract

Using optimal mass transport arguments, we prove weighted Sobolev inequalities of the form \[(∫E |u(x)|q\,ω(x) \,dx)1/q≤ K0\,(∫E |∇ u(x)|p\,σ(x)\,dx)1/p,\ \ u∈ C0∞( Rn),\ \ \ \ \ \ (WSI)\] where p≥ 1 and q>0 is the corresponding Sobolev critical exponent. Here E⊂eq Rn is an open convex cone, and ω,σ:E (0,∞) are two homogeneous weights verifying a general concavity-type structural condition. The constant K0= K0(n, p, q, ω, σ) >0 is given by an explicit formula. Under mild regularity assumptions on the weights, we also prove that K0 is optimal in (WSI) if and only if ω and σ are equal up to a multiplicative factor. Several previously known results, including the cases for monomials and radial weights, are covered by our statement. Further examples and applications to PDEs are also provided.