Sobolev embeddings and distance functions
Abstract
On a general open set of the euclidean space, we study the relation between the embedding of the homogeneous Sobolev space into and the summability properties of the distance function. We prove that in the superconformal case (i.e. when is larger than the dimension) these two facts are equivalent, while in the subconformal and conformal cases (i.e. when is less than or equal to the dimension) we construct counterexamples to this equivalence. In turn, our analysis permits to study the asymptotic behaviour of the positive solution of the Lane-Emden equation for the Laplacian with sub-homogeneous right-hand side, as the exponent diverges to . The case of first eigenfunctions of the Laplacian is included, as well. As particular cases of our analysis, we retrieve some well-known convergence results, under optimal assumptions on the open sets. We also give some new geometric estimates for generalized principal frequencies.
Cite
@article{arxiv.2301.13026,
title = {Sobolev embeddings and distance functions},
author = {Lorenzo Brasco and Francesca Prinari and Anna Chiara Zagati},
journal= {arXiv preprint arXiv:2301.13026},
year = {2023}
}
Comments
42 pages, 1 figure