Optimal Sobolev embeddings on Rn.

Jan Vybíral

Publicacions Matemàtiques (2007)

  • Volume: 51, Issue: 1, page 17-44
  • ISSN: 0214-1493

Abstract

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We study Sobolev-type embeddings involving rearrangement-invariant norms. In particular, we focus on the question when such embeddings are optimal. We concentrate on the case when the functions involved are defined on Rn. This subject has been studied before, but only on bounded domains. We first establish the equivalence of the Sobolev embedding to a new type of inequality involving two integral operators. Next, we show this inequality to be equivalent to the boundedness of a certain Hardy operator on a specific new type of cone of positive functions. This Hardy operator is then used to provide optimal domain and range rearrangement-invariant norm in the embedding inequality. Finally, the limiting case of the Sobolev embedding on Rn is studied in detail.

How to cite

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Vybíral, Jan. "Optimal Sobolev embeddings on Rn.." Publicacions Matemàtiques 51.1 (2007): 17-44. <http://eudml.org/doc/41885>.

@article{Vybíral2007,
abstract = {We study Sobolev-type embeddings involving rearrangement-invariant norms. In particular, we focus on the question when such embeddings are optimal. We concentrate on the case when the functions involved are defined on Rn. This subject has been studied before, but only on bounded domains. We first establish the equivalence of the Sobolev embedding to a new type of inequality involving two integral operators. Next, we show this inequality to be equivalent to the boundedness of a certain Hardy operator on a specific new type of cone of positive functions. This Hardy operator is then used to provide optimal domain and range rearrangement-invariant norm in the embedding inequality. Finally, the limiting case of the Sobolev embedding on Rn is studied in detail. },
author = {Vybíral, Jan},
journal = {Publicacions Matemàtiques},
keywords = {Espacios de funciones lineales; Espacios de funciones medibles; Espacios de Sobolev; Inmersiones; Sobolev-type embeddings; rearrangement-invariant norms; Hardy operator},
language = {eng},
number = {1},
pages = {17-44},
title = {Optimal Sobolev embeddings on Rn.},
url = {http://eudml.org/doc/41885},
volume = {51},
year = {2007},
}

TY - JOUR
AU - Vybíral, Jan
TI - Optimal Sobolev embeddings on Rn.
JO - Publicacions Matemàtiques
PY - 2007
VL - 51
IS - 1
SP - 17
EP - 44
AB - We study Sobolev-type embeddings involving rearrangement-invariant norms. In particular, we focus on the question when such embeddings are optimal. We concentrate on the case when the functions involved are defined on Rn. This subject has been studied before, but only on bounded domains. We first establish the equivalence of the Sobolev embedding to a new type of inequality involving two integral operators. Next, we show this inequality to be equivalent to the boundedness of a certain Hardy operator on a specific new type of cone of positive functions. This Hardy operator is then used to provide optimal domain and range rearrangement-invariant norm in the embedding inequality. Finally, the limiting case of the Sobolev embedding on Rn is studied in detail.
LA - eng
KW - Espacios de funciones lineales; Espacios de funciones medibles; Espacios de Sobolev; Inmersiones; Sobolev-type embeddings; rearrangement-invariant norms; Hardy operator
UR - http://eudml.org/doc/41885
ER -

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