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- Q5508773 subject Q7331861.
- Q5508773 abstract "In algebraic geometry, the function field of an algebraic variety V consists of objects which are interpreted as rational functions on V. In classical algebraic geometry they are ratios of polynomials; in complex algebraic geometry these are meromorphic functions and their higher-dimensional analogues; in modern algebraic geometry they are elements of some quotient ring's field of fractions.".
- Q5508773 wikiPageWikiLink Q1142704.
- Q5508773 wikiPageWikiLink Q1155772.
- Q5508773 wikiPageWikiLink Q1387602.
- Q5508773 wikiPageWikiLink Q162608.
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- Q5508773 wikiPageWikiLink Q180969.
- Q5508773 wikiPageWikiLink Q1879333.
- Q5508773 wikiPageWikiLink Q190109.
- Q5508773 wikiPageWikiLink Q193756.
- Q5508773 wikiPageWikiLink Q217616.
- Q5508773 wikiPageWikiLink Q3113164.
- Q5508773 wikiPageWikiLink Q3554813.
- Q5508773 wikiPageWikiLink Q382698.
- Q5508773 wikiPageWikiLink Q3889649.
- Q5508773 wikiPageWikiLink Q41237.
- Q5508773 wikiPageWikiLink Q449470.
- Q5508773 wikiPageWikiLink Q4723985.
- Q5508773 wikiPageWikiLink Q4724000.
- Q5508773 wikiPageWikiLink Q5277261.
- Q5508773 wikiPageWikiLink Q5508772.
- Q5508773 wikiPageWikiLink Q577835.
- Q5508773 wikiPageWikiLink Q648995.
- Q5508773 wikiPageWikiLink Q7331861.
- Q5508773 wikiPageWikiLink Q764115.
- Q5508773 wikiPageWikiLink Q774579.
- Q5508773 wikiPageWikiLink Q825857.
- Q5508773 wikiPageWikiLink Q909669.
- Q5508773 comment "In algebraic geometry, the function field of an algebraic variety V consists of objects which are interpreted as rational functions on V. In classical algebraic geometry they are ratios of polynomials; in complex algebraic geometry these are meromorphic functions and their higher-dimensional analogues; in modern algebraic geometry they are elements of some quotient ring's field of fractions.".
- Q5508773 label "Function field of an algebraic variety".