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THE DEGREE OF HOLOMORPHIC APPROXIMATION ON A TOTALLY REAL SET

Part of: Holomorphic convexity

Published online by Cambridge University Press:  09 February 2009

SAID ASSERDA
SAID ASSERDA*
Affiliation:
Université Ibn Tofail, Faculté des Sciences, Departement des Mathématiques, BP 242, Kénitra, Morocco (email: said.asserda@laposte.net)
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Abstract

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Let E be a totally real set on a Stein open set Ω on a complete noncompact Kähler manifold (M,g) with nonnegative holomorphic bisectional curvature such that (Ω,g) has bounded geometry at E. Then every function f in a Cp class with compact support on Ω and -flat on E up to order p−1,p≥2 (respectively, in a Gevrey class of order s>1, with compact support on Ω and -flat on E up to infinite order) can be approximated on compacts subsets of E by holomorphic functions fk on Ω with degree of approximation equal kp/2 (respectively, exp (−c(s)k1/2(s−1)) ).

Keywords

totally real setdegree of approximation∂ operator

MSC classification

Secondary: 32E30: Holomorphic and polynomial approximation, Runge pairs, interpolation
Type
Research Article
Information
Bulletin of the Australian Mathematical Society , Volume 79 , Issue 1 , February 2009 , pp. 171 - 176
Copyright
Copyright © Australian Mathematical Society 2009

References

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