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- Q3537483 subject Q7217286.
- Q3537483 abstract "In the mathematical field of group theory, the transfer defines, given a group G and a subgroup of finite index H, a group homomorphism from G to the abelianization of H. It can be used in conjunction with the Sylow theorems to obtain certain numerical results on the existence of finite simple groups.The transfer was defined by Issai Schur (1902) and rediscovered by Emil Artin (1929).".
- Q3537483 wikiPageWikiLink Q1057919.
- Q3537483 wikiPageWikiLink Q1408937.
- Q3537483 wikiPageWikiLink Q1464168.
- Q3537483 wikiPageWikiLink Q1744580.
- Q3537483 wikiPageWikiLink Q176916.
- Q3537483 wikiPageWikiLink Q18354462.
- Q3537483 wikiPageWikiLink Q212803.
- Q3537483 wikiPageWikiLink Q2526246.
- Q3537483 wikiPageWikiLink Q3113164.
- Q3537483 wikiPageWikiLink Q319400.
- Q3537483 wikiPageWikiLink Q351822.
- Q3537483 wikiPageWikiLink Q3527196.
- Q3537483 wikiPageWikiLink Q466109.
- Q3537483 wikiPageWikiLink Q49008.
- Q3537483 wikiPageWikiLink Q5128445.
- Q3537483 wikiPageWikiLink Q522216.
- Q3537483 wikiPageWikiLink Q5463860.
- Q3537483 wikiPageWikiLink Q57283.
- Q3537483 wikiPageWikiLink Q61768.
- Q3537483 wikiPageWikiLink Q7217286.
- Q3537483 wikiPageWikiLink Q751969.
- Q3537483 wikiPageWikiLink Q83478.
- Q3537483 wikiPageWikiLink Q868169.
- Q3537483 wikiPageWikiLink Q874429.
- Q3537483 wikiPageWikiLink Q878259.
- Q3537483 comment "In the mathematical field of group theory, the transfer defines, given a group G and a subgroup of finite index H, a group homomorphism from G to the abelianization of H. It can be used in conjunction with the Sylow theorems to obtain certain numerical results on the existence of finite simple groups.The transfer was defined by Issai Schur (1902) and rediscovered by Emil Artin (1929).".
- Q3537483 label "Transfer (group theory)".