Matches in DBpedia 2014 for { <http://dbpedia.org/resource/Hartogs'_extension_theorem> ?p ?o. }
Showing items 1 to 51 of
51
with 100 items per page.
- Hartogs'_extension_theorem abstract "In mathematics, precisely in the theory of functions of several complex variables, Hartogs' extension theorem is a statement about the singularities of holomorphic functions of several variables. Informally, it states that the support of the singularities of such functions cannot be compact, therefore the singular set of a function of several complex variables must (loosely speaking) 'go off to infinity' in some direction. More precisely, it shows that the concept of isolated singularity and removable singularity coincide for analytic functions of n > 1 complex variables. A first version of this theorem was proved by Friedrich Hartogs, and as such it is known also as Hartogs' lemma and Hartogs' principle: in earlier Soviet literature, it is also called Osgood-Brown theorem, acknowledging later work by Arthur Barton Brown and William Fogg Osgood. This property of holomorphic functions of several variables is also called Hartogs' phenomenon: however, the locution "Hartogs' phenomenon" is also used to identify the property of solutions of systems of partial differential or convolution equations satisfying Hartogs type theorems.".
- Hartogs'_extension_theorem wikiPageExternalLink v=onepage&q&f=true.
- Hartogs'_extension_theorem wikiPageExternalLink v=onepage&q&f=true.
- Hartogs'_extension_theorem wikiPageExternalLink DPubS?Service=UI&version=1.0&verb=Display&handle=euclid.
- Hartogs'_extension_theorem wikiPageExternalLink 1077489338.
- Hartogs'_extension_theorem wikiPageExternalLink 1195519488.
- Hartogs'_extension_theorem wikiPageExternalLink view?rid=comahe-001:1939-1940:12::10.
- Hartogs'_extension_theorem wikiPageExternalLink view?rid=comahe-002:1941-1942:14::21.
- Hartogs'_extension_theorem wikiPageExternalLink view?rid=comahe-002:1942-1943:15::26.
- Hartogs'_extension_theorem wikiPageExternalLink view?rid=comahe-002:1942-1943:15::27.
- Hartogs'_extension_theorem wikiPageExternalLink home.
- Hartogs'_extension_theorem wikiPageExternalLink browser.php?VoceID=2020.
- Hartogs'_extension_theorem wikiPageExternalLink browser.php?VoceID=2023.
- Hartogs'_extension_theorem wikiPageExternalLink www.digizeitschriften.de.
- Hartogs'_extension_theorem wikiPageExternalLink ?PPN=GDZPPN002260913.
- Hartogs'_extension_theorem wikiPageExternalLink item?id=RSMUP_1988__79__59_0.
- Hartogs'_extension_theorem wikiPageID "21663599".
- Hartogs'_extension_theorem wikiPageRevisionID "605824885".
- Hartogs'_extension_theorem first "E. M.".
- Hartogs'_extension_theorem hasPhotoCollection Hartogs'_extension_theorem.
- Hartogs'_extension_theorem id "10238".
- Hartogs'_extension_theorem id "10242".
- Hartogs'_extension_theorem id "h/h046650".
- Hartogs'_extension_theorem last "Chirka".
- Hartogs'_extension_theorem title "Failure of Hartogs' theorem in one dimension".
- Hartogs'_extension_theorem title "Hartogs theorem".
- Hartogs'_extension_theorem title "Hartogs' theorem".
- Hartogs'_extension_theorem title "Proof of Hartogs' theorem".
- Hartogs'_extension_theorem urlname "HartogsTheorem".
- Hartogs'_extension_theorem subject Category:Several_complex_variables.
- Hartogs'_extension_theorem subject Category:Theorems_in_complex_analysis.
- Hartogs'_extension_theorem type Abstraction100002137.
- Hartogs'_extension_theorem type Communication100033020.
- Hartogs'_extension_theorem type Message106598915.
- Hartogs'_extension_theorem type Proposition106750804.
- Hartogs'_extension_theorem type Statement106722453.
- Hartogs'_extension_theorem type Theorem106752293.
- Hartogs'_extension_theorem type TheoremsInComplexAnalysis.
- Hartogs'_extension_theorem comment "In mathematics, precisely in the theory of functions of several complex variables, Hartogs' extension theorem is a statement about the singularities of holomorphic functions of several variables. Informally, it states that the support of the singularities of such functions cannot be compact, therefore the singular set of a function of several complex variables must (loosely speaking) 'go off to infinity' in some direction.".
- Hartogs'_extension_theorem label "Hartogs' extension theorem".
- Hartogs'_extension_theorem label "Lemma von Hartogs".
- Hartogs'_extension_theorem label "Lemme de Hartogs".
- Hartogs'_extension_theorem sameAs Lemma_von_Hartogs.
- Hartogs'_extension_theorem sameAs Lemme_de_Hartogs.
- Hartogs'_extension_theorem sameAs 하르톡스_확장정리.
- Hartogs'_extension_theorem sameAs m.05msw72.
- Hartogs'_extension_theorem sameAs Q383238.
- Hartogs'_extension_theorem sameAs Q383238.
- Hartogs'_extension_theorem sameAs Hartogs'_extension_theorem.
- Hartogs'_extension_theorem wasDerivedFrom Hartogs'_extension_theorem?oldid=605824885.
- Hartogs'_extension_theorem isPrimaryTopicOf Hartogs'_extension_theorem.