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Displaying 61 – 80 of 406

Characterization of quasi-analytic functions of several variables by means of rational approximation

W. Pleśniak (1973)

Annales Polonici Mathematici

Characterization of surjective convolution operators on Sato's hyperfunctions

Michael Langenbruch (2010)

Banach Center Publications

Let $μ \in {(ℝ^{d})}^{'}$ be an analytic functional and let $T_{μ}$ be the corresponding convolution operator on Sato’s space $(ℝ^{d})$ of hyperfunctions. We show that $T_{μ}$ is surjective iff $T_{μ}$ admits an elementary solution in $(ℝ^{d})$ iff the Fourier transform μ̂ satisfies Kawai’s slowly decreasing condition (S). We also show that there are $0 \neq μ \in {(ℝ^{d})}^{'}$ such that $T_{μ}$ is not surjective on $(ℝ^{d})$ .

Characterization of the complex projective space by holomorphic vector fields.

Jun-Muk Hwang (1996)

Mathematische Zeitschrift

Characterization of the Unit Ball in Cn by Its Automorphism Group.

B. Wong (1977)

Inventiones mathematicae

Characterizations of the Unit Ball Bn in Complex Euclidean Space.

H. Wu, Ian Graham (1985)

Mathematische Zeitschrift

Characterizing singularities of varieties and of mappings.

Terence Gaffney, Herwig Hauser (1985)

Inventiones mathematicae

Chebyshev and Robin constants on algebraic curves

Jesse Hart, Sione Ma`u (2015)

Annales Polonici Mathematici

We define directional Robin constants associated to a compact subset of an algebraic curve. We show that these constants satisfy an upper envelope formula given by polynomials. We use this formula to relate the directional Robin constants of the set to its directional Chebyshev constants. These constants can be used to characterize algebraic curves on which the Siciak-Zaharjuta extremal function is harmonic.

Cheeger-Goreski-MacPherson's conjecture for the varieties with isolated singularities.

Takeo Ohsawa (1991)

Mathematische Zeitschrift

Chern classes and Hirzebruch-Riemann-Roch theorem for coherent sheaves on complex-projective orbifolds with isolated singularities.

Raimnund Blache (1996)

Mathematische Zeitschrift

Chern forms and the Riemann tensor for the moduli space ofcurves.

S.A. Wolpert (1986)

Inventiones mathematicae

Chern numbers for singular varieties and elliptic homology.

Totaro, Burt (2000)

Annals of Mathematics. Second Series

Chern numbers of a Kupka component

Omegar Calvo-Andrade, Marcio G. Soares (1994)

Annales de l'institut Fourier

We will consider codimension one holomorphic foliations represented by sections $ω \in H^{0} (ℙ^{n}, Ω^{1} (k))$ , and having a compact Kupka component $K$ . We show that the Chern classes of the tangent bundle of $K$ behave like Chern classes of a complete intersection 0 and, as a corollary we prove that $K$ is a complete intersection in some cases.

Chernklassen semi-stabiler Vektorraumbündel vom Rang 3 auf dem komplex-projektiven Raum.

Michael Schneider (1980)

Journal für die reine und angewandte Mathematik

Ck and Analytic Equivalence of Complex Analytic Varieties.

Joseph Becker (1977)

Mathematische Annalen

Ck Approximation by Holomorphic Functions and ...-Closed Forms on Ck Submanifolds of a Complex Manifold.

Yum-Tong Siu, R.Michael Range (1974)

Mathematische Annalen

C-Korrespondenzenkategorien, insbesondere über der Kategorie der komplexen Räume.

Günther Kraus (1975)

Manuscripta mathematica

Ck-Regularity for the ?-equation on Strictly Pseudoconvex Domains with Piecewise Smooth Boundaries.

Joachim Michel, Alessandro Perotti (1990)

Mathematische Zeitschrift

Classe fondamentale relative en cohomologie de Deligne et application.

Mohamed Kaddar (1996)

Mathematische Annalen

Classes caractéristiques et théorèmes d'indice : point de vue microlocal

Claude Sabbah (1995/1996)

Séminaire Bourbaki

Classes de cohomologie positives dans les variétés kählériennes compactes

Olivier Debarre (2004/2005)

Séminaire Bourbaki

Étant donnée une variété kählérienne compacte $X$ , on étudie dans l’espace vectoriel réel de cohomologie de Dolbeault $H^{1, 1} (X, 𝐑) \subset H^{2} (X, 𝐑)$ le cône convexe des classes de Kähler ainsi que celui, plus grand, des classes de courants positifs fermés de type $(1, 1)$ . Lorsque $X$ est projective, les traces de ces cônes sur l’espace de Néron–Severi $NS {(X)}_{𝐑} \subset H^{1, 1} (X, 𝐑)$ engendré par les classes entières sont respectivement le cône des classes de diviseurs amples et l’adhérence de celui des classes de diviseurs effectifs.

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