Título original | Enveloppes polynomiales de variétés réelles dans C2. |
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Título inglés | Polynomial hulls of real manifolds in C2. |
Título español | Envolventes polinomiales de variedades reales en C2. |
Autor/es | Gourlay, Boris |
Organización | Lab. Anal. Compl. Univ. Paul Sabatier, Toulouse, Francia |
Revista | 0214-1493 |
Publicación | 1993, 37 (1): 225-238, 6 Ref. |
Tipo de documento | articulo |
Idioma | Francés |
Resumen inglés | We present here three examples concerning polynomial hulls of some manifolds in C2. 1. Some real surfaces with equation w = P (z,z') + G(z) where P is a homogeneous polynomial of degree n and G(z) = o(|z|n) at 0 which are locally polynomially convex at 0. 2. Some real surfaces MF with equation w = zn+kz'n + F(z,z') such that the hull of Mf ∩ B'(0,1) contains a neighbourhood of 0. 3. A contable union of totally real planes (Pj) such that B'(0,1) ∩ (ÈjÎN Pj) is polynomially convex. |
Clasificación UNESCO | 120402 |
Palabras clave español | Variedades complejas ; Polinomios ; Convexidad |
Código MathReviews | MR1240933 |
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