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- Q7190517 subject Q8234760.
- Q7190517 abstract "In mathematics, Picard–Lefschetz theory studies the topology of a complex manifold by looking at the critical points of a holomorphic function on the manifold. It was introduced by Émile Picard for complex surfaces in his book Picard & Simart (1897), and extended to higher dimensions by Lefschetz (1924). It is a complex analog of Morse theory that studies the topology of a real manifold by looking at the critical points of a real function. Deligne & Katz (1973) extended Picard–Lefschetz theory to varieties over more general fields, and Deligne used this generalization in his proof of the Weil conjectures.".
- Q7190517 wikiPageExternalLink thoriedesfoncti00simagoog.
- Q7190517 wikiPageExternalLink books?id=eqCyQgAACAAJ.
- Q7190517 wikiPageExternalLink 0040-9383(81)90013-6.
- Q7190517 wikiPageWikiLink Q1479613.
- Q7190517 wikiPageWikiLink Q176916.
- Q7190517 wikiPageWikiLink Q203920.
- Q7190517 wikiPageWikiLink Q207476.
- Q7190517 wikiPageWikiLink Q2296951.
- Q7190517 wikiPageWikiLink Q286375.
- Q7190517 wikiPageWikiLink Q3532121.
- Q7190517 wikiPageWikiLink Q4205180.
- Q7190517 wikiPageWikiLink Q465654.
- Q7190517 wikiPageWikiLink Q543956.
- Q7190517 wikiPageWikiLink Q577705.
- Q7190517 wikiPageWikiLink Q578874.
- Q7190517 wikiPageWikiLink Q662830.
- Q7190517 wikiPageWikiLink Q8234760.
- Q7190517 comment "In mathematics, Picard–Lefschetz theory studies the topology of a complex manifold by looking at the critical points of a holomorphic function on the manifold. It was introduced by Émile Picard for complex surfaces in his book Picard & Simart (1897), and extended to higher dimensions by Lefschetz (1924). It is a complex analog of Morse theory that studies the topology of a real manifold by looking at the critical points of a real function.".
- Q7190517 label "Picard–Lefschetz theory".