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- Q4667496 subject Q7110104.
- Q4667496 subject Q8234752.
- Q4667496 subject Q8851962.
- Q4667496 subject Q8851964.
- Q4667496 abstract "In mathematics, Abhyankar's lemma (named after Shreeram Shankar Abhyankar) allows one to kill tame ramification by taking an extension of a base field. More precisely, Abhyankar's lemma states that if A, B, C are local fields such that A and B are finite extensions of C, with ramification indices a and b, and B is tamely ramified over C and b divides a, then the compositumAB is an unramified extension of A.".
- Q4667496 wikiPageExternalLink 1t_279.html.
- Q4667496 wikiPageWikiLink Q1389846.
- Q4667496 wikiPageWikiLink Q176916.
- Q4667496 wikiPageWikiLink Q1868517.
- Q4667496 wikiPageWikiLink Q225527.
- Q4667496 wikiPageWikiLink Q2379946.
- Q4667496 wikiPageWikiLink Q340145.
- Q4667496 wikiPageWikiLink Q3493864.
- Q4667496 wikiPageWikiLink Q395.
- Q4667496 wikiPageWikiLink Q4667492.
- Q4667496 wikiPageWikiLink Q7110104.
- Q4667496 wikiPageWikiLink Q8234752.
- Q4667496 wikiPageWikiLink Q8851962.
- Q4667496 wikiPageWikiLink Q8851964.
- Q4667496 wikiPageWikiLink Q899635.
- Q4667496 comment "In mathematics, Abhyankar's lemma (named after Shreeram Shankar Abhyankar) allows one to kill tame ramification by taking an extension of a base field. More precisely, Abhyankar's lemma states that if A, B, C are local fields such that A and B are finite extensions of C, with ramification indices a and b, and B is tamely ramified over C and b divides a, then the compositumAB is an unramified extension of A.".
- Q4667496 label "Abhyankar's lemma".