About: Cauchy's integral formula   Sponge Permalink

An Entity of Type : owl:Thing, within Data Space : 134.155.108.49:8890 associated with source dataset(s)

Cauchy's integral formula is a theorem in complex analysis which relates a holomorphic function defined on a disk to its values on the edge of the disk, and gives a formula for for every within the disk, or outside if the function is holomorphic everywhere. If , this simplifies to File:GammaAbsSmallPlot.svg This complex analysis-related article contains minimal information concerning its topic. You can help the Mathematics Wikia by adding to it.

AttributesValues
rdfs:label
  • Cauchy's integral formula
rdfs:comment
  • Cauchy's integral formula is a theorem in complex analysis which relates a holomorphic function defined on a disk to its values on the edge of the disk, and gives a formula for for every within the disk, or outside if the function is holomorphic everywhere. If , this simplifies to File:GammaAbsSmallPlot.svg This complex analysis-related article contains minimal information concerning its topic. You can help the Mathematics Wikia by adding to it.
sameAs
dcterms:subject
dbkwik:math/proper...iPageUsesTemplate
abstract
  • Cauchy's integral formula is a theorem in complex analysis which relates a holomorphic function defined on a disk to its values on the edge of the disk, and gives a formula for for every within the disk, or outside if the function is holomorphic everywhere. If , this simplifies to File:GammaAbsSmallPlot.svg This complex analysis-related article contains minimal information concerning its topic. You can help the Mathematics Wikia by adding to it.
Alternative Linked Data Views: ODE     Raw Data in: CXML | CSV | RDF ( N-Triples N3/Turtle JSON XML ) | OData ( Atom JSON ) | Microdata ( JSON HTML) | JSON-LD    About   
This material is Open Knowledge   W3C Semantic Web Technology [RDF Data] Valid XHTML + RDFa
OpenLink Virtuoso version 07.20.3217, on Linux (x86_64-pc-linux-gnu), Standard Edition
Data on this page belongs to its respective rights holders.
Virtuoso Faceted Browser Copyright © 2009-2012 OpenLink Software