Revision as of 03:21, 20 January 2021 edit Huggums537 (talk \| contribs) Extended confirmed users, IP block exemptions, Pending changes reviewers, Rollbackers 14,933 edits m Adding local short description: "Function locally given by a convergent power series", overriding Wikidata description "function that is locally given by a convergent power series" (Shortdesc helper) ← Previous edit		Revision as of 09:28, 3 February 2021 edit undo 176.23.111.227 (talk) Grammatical error Next edit →
Line 3: {{about\|both real and complex analytic functions\|analytic functions in complex analysis specifically\|holomorphic function}} {{Complex analysis sidebar}} In [[mathematics]], an '''analytic function''' is a [[function (mathematics)\|function]] that is locally given by a [[convergent series\|convergent]] [[power series]]. There exist both '''real analytic functions''' and '''complex analytic functions'''. Functions of each type are [[smooth function\|infinitely differentiable]], but complex analytic functions exhibit properties that do not ~~hold~~ generally hold for real analytic functions. A function is analytic if and only if its [[Taylor series]] about ''x''<sub>0</sub> converges to the function in some [[neighborhood (topology)\|neighborhood]] for every ''x''<sub>0</sub> in its [[Domain of a function\|___domain]]. == Definitions ==

Analytic function: Difference between revisions