K�hlerianity of q-Stein spaces
Copyright policy )K�hlerianity of q-Stein spaces
The aim of this short paper is to show that \(q\)-Stein spaces, recently introduced by the reviewer and \textit{A. Silva} [Math. Ann. 296, No. 4, 649-665 (1993; Zbl 0788.32007)] are (globally) strongly Kähler. The method gives also an alternative proof of the \(q\)-completeness \((q=0\) is the classical case of Stein spaces).
- University of Zurich Switzerland
- Romanian Academy Romania
\(q\)-convexity, \(q\)-concavity, \(q\)-complete spaces, \(q\)-Stein spaces, Stein spaces, Global differential geometry of Hermitian and Kählerian manifolds, Kähler space, Holomorphically convex complex spaces, reduction theory, Kählerian spaces, Kähler manifolds, \(q\)-completeness
\(q\)-convexity, \(q\)-concavity, \(q\)-complete spaces, \(q\)-Stein spaces, Stein spaces, Global differential geometry of Hermitian and Kählerian manifolds, Kähler space, Holomorphically convex complex spaces, reduction theory, Kählerian spaces, Kähler manifolds, \(q\)-completeness
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