Results 181 to 190 of about 5,076 (216)
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Locally Stein Open Subsets in Normal Stein Spaces
The Journal of Geometric Analysis, 2014zbMATH Open Web Interface contents unavailable due to conflicting licenses.
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K�hlerianity of q-Stein spaces
Archiv der Mathematik, 1996The 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).
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1986
As we shall see in Chapter VI, the possibility of finding an embedding of a real analytic variety or space into Rq is closely related to the fact that the Stein spaces (whether reduced or not) of type N can be embedded into ℂn.
Francesco Guaraldo +2 more
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As we shall see in Chapter VI, the possibility of finding an embedding of a real analytic variety or space into Rq is closely related to the fact that the Stein spaces (whether reduced or not) of type N can be embedded into ℂn.
Francesco Guaraldo +2 more
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Stein–Weiss inequalities on Morrey spaces
The Journal of AnalysiszbMATH Open Web Interface contents unavailable due to conflicting licenses.
Daniel Salim +3 more
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GLOBAL CONSTRUCTION OF THE NORMALIZATION OF STEIN SPACES
1988Let X be a Stein space, \(\tilde X\) its normalization. Stein spaces X can be completely described by the algebra \({\mathcal O}(X)\) of global holomorphic functions. The question is can the normalization \(\tilde X\) of X be constructed just from the holomorphic functions on X.
Hayes, Sandra, Pourcin, Geneviève
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Deformation retracts of Stein spaces
Mathematische Annalen, 1997Let \(X\) be an \(n\)-dimensional Stein space. It was proved by \textit{H. Hamm} [J. Reine Angew. Math. 338, 121-135 (1983; Zbl 0491.32010); J. Reine Angew. Math. 364, 1-9 (1986; Zbl 0567.32005)], \textit{M.Goresky} and \textit{R. MacPherson} [Stratified Morse Theory.
Hamm, Helmut A., Mihalache, Nicolae
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Convexity Properties of Analytic Complements in Stein Spaces
2020From the Introduction: ``It is well known that geometric convexity properties of complex manifolds or, more generally, complex spaces, imply strong analytic consequences. For the case of geometric 1-completeness this is the heart of the solution of the Levi problem together with Theorem B of Cartan and Serre; more generally, for \(q\)-completeness this
Coltoiu, M., Diederich, K.
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Nonabelian duality on Stein spaces
American Journal of Mathematics, 1998It is well known that a Stein complex space can be recovered from its algebra of holomorphic functions. Taking the infinite dimensional Lie group of holomorphic matrices instead of holomorphic functions, we show that a similar result holds. This may be interpreted as a biduality statement in a nonabelian situation.
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Carnot spaces and the k-stein condition
advg, 2006Abstract A riemannian manifold M with associated Jacobi operators R X (R X Y = R(Y, X) X), X in TM, is said to be k-stein, k ≥ 1, if there exists a function μk on M such that tr(R k
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