Revision as of 09:12, 11 November 2019 edit 2600:1700:9750:4cb0:5858:ff0:cad4:c183 (talk) wording Tag: Visual edit ← Previous edit		Revision as of 14:07, 20 January 2021 edit undo D.Lazard (talk \| contribs) Extended confirmed users 35,642 edits →top: standardizing the hatnote format Next edit →
Line 1: {{~~dablink~~about\|~~Note~~a ~~that~~theorem ~~the~~on ~~terminology~~separate ~~is inconsistent and Hartogs's~~holomorphicity\|a theorem ~~may~~on ~~also mean~~removable [[singularities\|Hartogs's lemma]]\|a on ~~removable singularities, the result~~theorem on [[infinite ordinals\|Hartogs number]]\|a intheorem ~~axiomatic~~on ~~set~~extensions ~~theory,~~of orholomorphic [[functions\|Hartogs's extension theorem~~]].~~}} In [[mathematics]], '''Hartogs's theorem''' is a fundamental result of [[Friedrich Hartogs]] in the theory of [[several complex variables]]. Roughly speaking, it states that a 'separately analytic' function is continuous. More precisely, if <math>F:{\textbf{C}}^n \to {\textbf{C}}</math> is a function which is [[analytic function\|analytic]] in each variable ''z''<sub>''i''</sub>, 1 ≤ ''i'' ≤ ''n'', while the other variables are held constant, then ''F'' is a [[continuous function]].

Hartogs's theorem on separate holomorphicity: Difference between revisions