Some inequalities on weighted Sobolev spaces, distance weights and the Assouad dimension

Abstract

We study certain inequalities and a related result on weighted Sobolev spaces on bounded John domains in Rn. Namely, we prove the existence of a right inverse for the divergence operator, along with the corresponding a priori estimate, the improved and the fractional Poincar\'e inequalities, the Korn inequality and the local Fefferman-Stein inequality. All these results are obtained on weighted Sobolev spaces, where the weight is a power of the distance to the boundary. In all cases the exponent of the weight d(·,∂)β p is only required to satisfy the restriction: β p>-(n-A(∂)), where p is the exponent of the Sobolev space and A(∂) is the Assouad dimension of the boundary of the domain. According to our best knowledge, this condition is less restrictive than the ones in the literature.