Continuous solutions for divergence-type equations associated to elliptic systems of complex vector fields (2017)
- Authors:
- Autor USP: PICON, TIAGO HENRIQUE - FFCLRP
- Unidade: FFCLRP
- Subjects: VETORES; MATEMÁTICA; EQUAÇÕES
- Language: Inglês
- Imprenta:
- Source:
- Título: Arxiv Mathematics
- Conference titles: Workshop on Geometric Analysis of PDEs and Several Complex Variables
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ABNT
MOONENS, Laurent e PICON, Tiago. Continuous solutions for divergence-type equations associated to elliptic systems of complex vector fields. 2017, Anais.. Ithaca: Faculdade de Filosofia, Ciências e Letras de Ribeirão Preto, Universidade de São Paulo, 2017. . Acesso em: 18 jul. 2025. -
APA
Moonens, L., & Picon, T. (2017). Continuous solutions for divergence-type equations associated to elliptic systems of complex vector fields. In Arxiv Mathematics. Ithaca: Faculdade de Filosofia, Ciências e Letras de Ribeirão Preto, Universidade de São Paulo. -
NLM
Moonens L, Picon T. Continuous solutions for divergence-type equations associated to elliptic systems of complex vector fields. Arxiv Mathematics. 2017 ;[citado 2025 jul. 18 ] -
Vancouver
Moonens L, Picon T. Continuous solutions for divergence-type equations associated to elliptic systems of complex vector fields. Arxiv Mathematics. 2017 ;[citado 2025 jul. 18 ] - Pseudodifferential operators, Rellich-Kondrachov theorem and Sobolev-Hardy spaces
- Div–curl type estimates for elliptic systems of complex vector fields
- Local Hardy-Sobolev inequalities for canceling elliptic differential operators
- Stein-Weiss inequality in L 1 norm for vector fields
- Sobolev solvability of elliptic homogenous linear equations on Borel measures
- Stein-Weiss type inequality in L1 norm for vector fields and applications
- A note on lebesgue solvability of elliptic homogeneous linear equations with measure data
- On local continuous solvability of equations associated to elliptic and canceling linear differential operators
- Hausdorff dimension of removable sets for elliptic and canceling homogeneous differential operators in the class of bounded functions
- Regularity of maximal functions on Hardy-Sobolev spaces
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