Continuous solutions for divergence-type equations associated to elliptic systems of complex vector fields (2017)
- Autor:
- Autor USP: PICON, TIAGO HENRIQUE - FFCLRP
- Unidade: FFCLRP
- Subjects: EQUAÇÕES; OPERADORES ELÍTICOS; OPERADORES PSEUDODIFERENCIAIS
- Agências de fomento:
- Language: Inglês
- Imprenta:
- Source:
- Título: Abstract
- Conference titles: South American Workshop on Integral and Differential Equations - SAWIDE
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ABNT
PICON, Tiago Henrique. Continuous solutions for divergence-type equations associated to elliptic systems of complex vector fields. 2017, Anais.. São Paulo: IME-USP, 2017. . Acesso em: 11 jan. 2026. -
APA
Picon, T. H. (2017). Continuous solutions for divergence-type equations associated to elliptic systems of complex vector fields. In Abstract. São Paulo: IME-USP. -
NLM
Picon TH. Continuous solutions for divergence-type equations associated to elliptic systems of complex vector fields. Abstract. 2017 ;[citado 2026 jan. 11 ] -
Vancouver
Picon TH. Continuous solutions for divergence-type equations associated to elliptic systems of complex vector fields. Abstract. 2017 ;[citado 2026 jan. 11 ] - Div–curl type estimates for elliptic systems of complex vector fields
- The Rellich-Kondrachov compactness theorem for localizable Hardy-Sobolev spaces
- Lp-Lq decay estimates for the linear fractional diffusive equation
- Local Hardy-Sobolev inequalities for canceling elliptic differential operators
- Pseudodifferential operators, Rellich-Kondrachov theorem and Sobolev-Hardy spaces
- Fractional Hardy-Sobolev inequalities for elliptic differential operators
- L strong charges for elliptic systems of complex vector fields
- Local Hardy-Littlewood-Sobolev inequalities for canceling elliptic differential operators
- L1 Sobolev estimates for (pseudo)-differential operators and applications
- Local L1 estimates for elliptic systems of complex vector fields
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