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- Q5251701 subject Q7217289.
- Q5251701 abstract "In mathematics, a deformation ring is a ring that controls liftings of a representation of a Galois group from a finite field to a local field. In particular for any such lifting problem there is often a universal deformation ring that classifies all such liftings, and whose spectrum is the universal deformation space.A key step in Wiles's proof of the modularity theorem was to study the relation between universal deformation rings and Hecke algebras.".
- Q5251701 wikiPageExternalLink books?id=Va-quzVwtMsC.
- Q5251701 wikiPageWikiLink Q1154351.
- Q5251701 wikiPageWikiLink Q161172.
- Q5251701 wikiPageWikiLink Q176916.
- Q5251701 wikiPageWikiLink Q184433.
- Q5251701 wikiPageWikiLink Q1868517.
- Q5251701 wikiPageWikiLink Q395.
- Q5251701 wikiPageWikiLink Q5696378.
- Q5251701 wikiPageWikiLink Q603880.
- Q5251701 wikiPageWikiLink Q649469.
- Q5251701 wikiPageWikiLink Q7217289.
- Q5251701 wikiPageWikiLink Q730384.
- Q5251701 comment "In mathematics, a deformation ring is a ring that controls liftings of a representation of a Galois group from a finite field to a local field. In particular for any such lifting problem there is often a universal deformation ring that classifies all such liftings, and whose spectrum is the universal deformation space.A key step in Wiles's proof of the modularity theorem was to study the relation between universal deformation rings and Hecke algebras.".
- Q5251701 label "Deformation ring".