Improved Poincaré inequalities and solutions of the divergence in weighted norms
- Autores
- Acosta, Gabriel; Cejas, María Eugenia; Durán, Ricardo Guillermo
- Año de publicación
- 2017
- Idioma
- inglés
- Tipo de recurso
- artículo
- Estado
- versión publicada
- Descripción
- The improved Poincaré inequality ∣∣φ-φΩ∣∣ Lp(Ω)≤C ∣∣d∇φ Lp(Ω) Where Ω ⊂ Rn is a bounded domain and d(x) is the distance from x to the boundary of Ω, has many applications. In particular, it can be used to obtain a decomposition of functions with vanishing integral into a sum of locally supported functions with the same property. Consequently, it can be used to go from local to global results, i.e., to extend to very general bounded domains results which are known for cubes. For example, this methodology can be used to prove the existence of solutions of the divergence in Sobolev spaces. The goal of this paper is to analyze the generalization of these results to the case of weighted norms. When the weight is in Ap the arguments used in the un-weighted case can be extended without great difficulty. However, we will show that the improved Poincaré inequality, as well as its above mentioned applications, can be extended to a more general class of weights.
Facultad de Ciencias Exactas - Materia
-
Matemática
Divergence operator
Poincaré inequalities
Weights - Nivel de accesibilidad
- acceso abierto
- Condiciones de uso
- http://creativecommons.org/licenses/by-nc-sa/4.0/
- Repositorio
.jpg)
- Institución
- Universidad Nacional de La Plata
- OAI Identificador
- oai:sedici.unlp.edu.ar:10915/87652
Ver los metadatos del registro completo
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Improved Poincaré inequalities and solutions of the divergence in weighted normsAcosta, GabrielCejas, María EugeniaDurán, Ricardo GuillermoMatemáticaDivergence operatorPoincaré inequalitiesWeightsThe improved Poincaré inequality ∣∣φ-φΩ∣∣ Lp(Ω)≤C ∣∣d∇φ Lp(Ω) Where Ω ⊂ Rn is a bounded domain and d(x) is the distance from x to the boundary of Ω, has many applications. In particular, it can be used to obtain a decomposition of functions with vanishing integral into a sum of locally supported functions with the same property. Consequently, it can be used to go from local to global results, i.e., to extend to very general bounded domains results which are known for cubes. For example, this methodology can be used to prove the existence of solutions of the divergence in Sobolev spaces. The goal of this paper is to analyze the generalization of these results to the case of weighted norms. When the weight is in Ap the arguments used in the un-weighted case can be extended without great difficulty. However, we will show that the improved Poincaré inequality, as well as its above mentioned applications, can be extended to a more general class of weights.Facultad de Ciencias Exactas2017info:eu-repo/semantics/articleinfo:eu-repo/semantics/publishedVersionArticulohttp://purl.org/coar/resource_type/c_6501info:ar-repo/semantics/articuloapplication/pdf211-226http://sedici.unlp.edu.ar/handle/10915/87652enginfo:eu-repo/semantics/altIdentifier/issn/1239-629Xinfo:eu-repo/semantics/altIdentifier/doi/10.5186/aasfm.2017.4212info:eu-repo/semantics/openAccesshttp://creativecommons.org/licenses/by-nc-sa/4.0/Creative Commons Attribution-NonCommercial-ShareAlike 4.0 International (CC BY-NC-SA 4.0)reponame:SEDICI (UNLP)instname:Universidad Nacional de La Platainstacron:UNLP2025-09-29T11:17:18Zoai:sedici.unlp.edu.ar:10915/87652Institucionalhttp://sedici.unlp.edu.ar/Universidad públicaNo correspondehttp://sedici.unlp.edu.ar/oai/snrdalira@sedici.unlp.edu.arArgentinaNo correspondeNo correspondeNo correspondeopendoar:13292025-09-29 11:17:19.179SEDICI (UNLP) - Universidad Nacional de La Platafalse |
| dc.title.none.fl_str_mv |
Improved Poincaré inequalities and solutions of the divergence in weighted norms |
| title |
Improved Poincaré inequalities and solutions of the divergence in weighted norms |
| spellingShingle |
Improved Poincaré inequalities and solutions of the divergence in weighted norms Acosta, Gabriel Matemática Divergence operator Poincaré inequalities Weights |
| title_short |
Improved Poincaré inequalities and solutions of the divergence in weighted norms |
| title_full |
Improved Poincaré inequalities and solutions of the divergence in weighted norms |
| title_fullStr |
Improved Poincaré inequalities and solutions of the divergence in weighted norms |
| title_full_unstemmed |
Improved Poincaré inequalities and solutions of the divergence in weighted norms |
| title_sort |
Improved Poincaré inequalities and solutions of the divergence in weighted norms |
| dc.creator.none.fl_str_mv |
Acosta, Gabriel Cejas, María Eugenia Durán, Ricardo Guillermo |
| author |
Acosta, Gabriel |
| author_facet |
Acosta, Gabriel Cejas, María Eugenia Durán, Ricardo Guillermo |
| author_role |
author |
| author2 |
Cejas, María Eugenia Durán, Ricardo Guillermo |
| author2_role |
author author |
| dc.subject.none.fl_str_mv |
Matemática Divergence operator Poincaré inequalities Weights |
| topic |
Matemática Divergence operator Poincaré inequalities Weights |
| dc.description.none.fl_txt_mv |
The improved Poincaré inequality ∣∣φ-φΩ∣∣ Lp(Ω)≤C ∣∣d∇φ Lp(Ω) Where Ω ⊂ Rn is a bounded domain and d(x) is the distance from x to the boundary of Ω, has many applications. In particular, it can be used to obtain a decomposition of functions with vanishing integral into a sum of locally supported functions with the same property. Consequently, it can be used to go from local to global results, i.e., to extend to very general bounded domains results which are known for cubes. For example, this methodology can be used to prove the existence of solutions of the divergence in Sobolev spaces. The goal of this paper is to analyze the generalization of these results to the case of weighted norms. When the weight is in Ap the arguments used in the un-weighted case can be extended without great difficulty. However, we will show that the improved Poincaré inequality, as well as its above mentioned applications, can be extended to a more general class of weights. Facultad de Ciencias Exactas |
| description |
The improved Poincaré inequality ∣∣φ-φΩ∣∣ Lp(Ω)≤C ∣∣d∇φ Lp(Ω) Where Ω ⊂ Rn is a bounded domain and d(x) is the distance from x to the boundary of Ω, has many applications. In particular, it can be used to obtain a decomposition of functions with vanishing integral into a sum of locally supported functions with the same property. Consequently, it can be used to go from local to global results, i.e., to extend to very general bounded domains results which are known for cubes. For example, this methodology can be used to prove the existence of solutions of the divergence in Sobolev spaces. The goal of this paper is to analyze the generalization of these results to the case of weighted norms. When the weight is in Ap the arguments used in the un-weighted case can be extended without great difficulty. However, we will show that the improved Poincaré inequality, as well as its above mentioned applications, can be extended to a more general class of weights. |
| publishDate |
2017 |
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2017 |
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