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- Q5042898 subject Q7139572.
- Q5042898 subject Q8442255.
- Q5042898 subject Q8458587.
- Q5042898 abstract "In mathematics, in the area of complex analysis, Carlson's theorem is a uniqueness theorem which was discovered by Fritz David Carlson. Informally, it states that two different analytic functions which do not grow very fast at infinity can not coincide at the integers. The theorem may be obtained from the Phragmén–Lindelöf theorem, which is itself an extension of the maximum-modulus theorem.Carlson's theorem is typically invoked to defend the uniqueness of a Newton series expansion. Carlson's theorem has generalized analogues for other expansions.".
- Q5042898 wikiPageWikiLink Q1050230.
- Q5042898 wikiPageWikiLink Q184337.
- Q5042898 wikiPageWikiLink Q193756.
- Q5042898 wikiPageWikiLink Q2068418.
- Q5042898 wikiPageWikiLink Q209875.
- Q5042898 wikiPageWikiLink Q395.
- Q5042898 wikiPageWikiLink Q4378868.
- Q5042898 wikiPageWikiLink Q45099.
- Q5042898 wikiPageWikiLink Q526013.
- Q5042898 wikiPageWikiLink Q5421531.
- Q5042898 wikiPageWikiLink Q5504887.
- Q5042898 wikiPageWikiLink Q7139572.
- Q5042898 wikiPageWikiLink Q752723.
- Q5042898 wikiPageWikiLink Q7673219.
- Q5042898 wikiPageWikiLink Q7886966.
- Q5042898 wikiPageWikiLink Q8442255.
- Q5042898 wikiPageWikiLink Q8458587.
- Q5042898 wikiPageWikiLink Q847600.
- Q5042898 comment "In mathematics, in the area of complex analysis, Carlson's theorem is a uniqueness theorem which was discovered by Fritz David Carlson. Informally, it states that two different analytic functions which do not grow very fast at infinity can not coincide at the integers. The theorem may be obtained from the Phragmén–Lindelöf theorem, which is itself an extension of the maximum-modulus theorem.Carlson's theorem is typically invoked to defend the uniqueness of a Newton series expansion.".
- Q5042898 label "Carlson's theorem".