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- Q1330788 subject Q7139572.
- Q1330788 abstract "In mathematics, and particularly in the field of complex analysis, the Weierstrass factorization theorem asserts that entire functions can be represented by a product involving their zeroes. In addition, every sequence tending to infinity has an associated entire function with zeroes at precisely the points of that sequence. The theorem is named after Karl Weierstrass.A second form of the theorem extends to meromorphic functions and allows one to consider a given meromorphic function as a product of three factors: terms depending on the function's poles and zeroes, and an associated non-zero holomorphic function.".
- Q1330788 wikiPageWikiLink Q1315949.
- Q1330788 wikiPageWikiLink Q133250.
- Q1330788 wikiPageWikiLink Q188804.
- Q1330788 wikiPageWikiLink Q192760.
- Q1330788 wikiPageWikiLink Q193756.
- Q1330788 wikiPageWikiLink Q204.
- Q1330788 wikiPageWikiLink Q207476.
- Q1330788 wikiPageWikiLink Q213363.
- Q1330788 wikiPageWikiLink Q217616.
- Q1330788 wikiPageWikiLink Q2266843.
- Q1330788 wikiPageWikiLink Q272404.
- Q1330788 wikiPageWikiLink Q328998.
- Q1330788 wikiPageWikiLink Q395.
- Q1330788 wikiPageWikiLink Q43260.
- Q1330788 wikiPageWikiLink Q57103.
- Q1330788 wikiPageWikiLink Q588247.
- Q1330788 wikiPageWikiLink Q7139572.
- Q1330788 wikiPageWikiLink Q825857.
- Q1330788 wikiPageWikiLink Q82794.
- Q1330788 wikiPageWikiLink Q847600.
- Q1330788 comment "In mathematics, and particularly in the field of complex analysis, the Weierstrass factorization theorem asserts that entire functions can be represented by a product involving their zeroes. In addition, every sequence tending to infinity has an associated entire function with zeroes at precisely the points of that sequence.".
- Q1330788 label "Weierstrass factorization theorem".