Several complex variables in Poland

• Autorzy: Wiegerinck J.
• Konferencja: 6th European Congress of Mathematics, 2-7 July 2012 Kraków
• Języki publikacji: EN

Słowa kluczowe

EN

several complex variables; Jagiellonian University in Kraków; Polish mathematicians

• Wydawca: Polskie Towarzystwo Matematyczne
• Czasopismo: Wiadomości Matematyczne
• Rocznik: 2012
• Tom: T. 48, Nr 2
• Strony: 285--292
• Opis fizyczny: Bibliogr. 27 poz.

Twórcy

autor

Wiegerinck J.

• Department of Mathematics University of Amsterdam Science Park 904 Postbus 94248, 1090 GE Amsterdam The Netherlands

Bibliografia

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• [4] Z. Błocki, P. Pflug, Hyperconvexity and Bergman completeness, Nagoya Math.J. 151 (1998), 221-225.
• [5] Z. Błocki, On the definition of the Monge-Ampere operator in C2, Math. Ann. 328 (2004)^0.3,415-423.
• [61 Z, Błocki, The Bergman metric and the pluricomplex Green function, Trans. Amer. Math. Soc. 357 (2005), no. 7, 2613-2625.
• [7] K. Ciesielski, Professor Józef Siciak – a scholar and educator. Proceedings of Conference on Complex Analysis (Bielsko-Biala, 2001). Ann. Polon. Math. 80 (2003), 1-15.
• [8] A. Edigarian, W. Zwonek, Geometry of the symmetrized polydisc, Arch. Math. (Basel) 84 (2005), no. 4, 364-374.
• [9] A. Edigarian, On definitions of the pluricomplex Green function, Ann. Polon. Math. 67 (1997), no. 3, 233-246.
• [10] A. Edigarian, W. Zwonek, Invariance of the pluricomplex Green function under proper mappings with applications, Complex Variables Theory Appl. 35 (1998), no. 4, 367-380.
• [11] F. Hartogs, Zur Theorie der analytischen Funktionen mehrerer unabhängiger Veränderlichen, insbesondere über die Darstellung derselben durch Reihen, nach Potenzen einer Veranderlichen fortschreiten, Math. Ann. 62 (1906), no. 1, 1-88.
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• [18] S. Kołodziej, The complex Monge-Amperc equation, Acta Math. 180 (1998). no. 1, 69-117.
• [19] S. Kołodziej, The complex Monge-Ampere equation and pluripotential theory, Mem. Amer. Math. Soc. 178 (2005), no. 840.
• [20] W. Pleśniak, Markov’s inequality and the existence of an extension operator for C°° functions, J. Approx. Theory 61 (1990), no. 1, 106-117.
• [21] M. Schiffer, Stefan Bergman (JS95-1977): in memoriam, Ann. Polon. Math. 39 (1981), 5-9.
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• [27] W. Zwonek, On hyperbolicity of pseudoconvex Reinhardt domains, Arch. Math. (Basel) 72 (1999), no. 4, 304-314.