Deprecated: $wgMWOAuthSharedUserIDs=false is deprecated, set $wgMWOAuthSharedUserIDs=true, $wgMWOAuthSharedUserSource='local' instead [Called from MediaWiki\HookContainer\HookContainer::run in /var/www/html/w/includes/HookContainer/HookContainer.php at line 135] in /var/www/html/w/includes/Debug/MWDebug.php on line 372
Intersection theory in analytic geometry - MaRDI portal

Intersection theory in analytic geometry

From MaRDI portal

Publication:2527538

Jump to:navigation, search

DOI10.1007/BF01350737zbMath0157.40502MaRDI QIDQ2527538

Richard N. Draper

Publication date: 1969

Published in: Mathematische Annalen (Search for Journal in Brave)

Full work available at URL: https://eudml.org/doc/161797

zbMATH Keywords

complex functions

Related Items

On nearly smooth complex spaces, Multiplicity and the pull-back problem, A note on separation of algebraic sets and the Łojasiewicz exponent for polynomial mappings, Multiplicity and Semicontinuity of the Łojasiewicz Exponent, Une théorie de l'intersection dans un espace singulier, Motivic local density, Polynomial bound on the local Betti numbers of a real analytic germ, On Lipschitz geometry at infinity of complex analytic sets, Characterization of Lipschitz normally embedded complex curves, On characterization of smoothness of complex analytic sets, On the Noether exponent and other applications of local intersection index, The Lelong Number of a Complete Intersection, Whitney stratifications and the continuity of local Lipschitz–Killing curvatures, Équisingularité réelle : nombres de Lelong et images polaires, Effective calculations of the multiplicity of polynomial mappings, On the Nullstellensatz for c-holomorphic functions with algebraic graphs, Analytic Sets as Branched Coverings, Effective Bertini theorem and formulas for multiplicity and the local Łojasiewicz exponent, Global Residues and Intersections on a Complex Manifold, Multiplicity of analytic hypersurface singularities under bi-Lipschitz homeomorphisms, Cycle exceptionnel de l'éclatement d'un idéal définissant l'origine de \({\mathbb C}^ n\) et applications. (Exceptional cycle of the blowing-up of an ideal defining the origin of \({\mathbb C}^ n\) and applications), A proof of the differentiable invariance of the multiplicity using spherical blowing-up, Tangent Cones of Lipschitz Normally Embedded Sets Are Lipschitz Normally Embedded. Appendix by Anne Pichon and Walter D. Neumann, Limit of Tangents on Complex Surfaces, Three structure theorems in several complex variables

Cites Work

Retrieved from "https://portal.mardi4nfdi.de/w/index.php?title=Publication:2527538&oldid=15254974"