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- Dade_isometry abstract "In mathematical finite group theory, the Dade isometry is an isometry from class functions on a subgroup H with support on a subset K of H to class functions on a group G (Collins 1990, 6.1). It was introduced by Dade (1964) as a generalization and simplification of an isometry used by Feit & Thompson (1963) in their proof of the odd order theorem, and was used by Peterfalvi (2000) in his revision of the character theory of the odd order theorem.".
- Dade_isometry wikiPageExternalLink books?id=t-vuAAAAMAAJ.
- Dade_isometry wikiPageExternalLink books?isbn=0521234409.
- Dade_isometry wikiPageExternalLink books?isbn=052164660X.
- Dade_isometry wikiPageExternalLink Journal?authority=euclid.pjm&issue=1103053941.
- Dade_isometry wikiPageID "29775880".
- Dade_isometry wikiPageRevisionID "504987679".
- Dade_isometry hasPhotoCollection Dade_isometry.
- Dade_isometry subject Category:Finite_groups.
- Dade_isometry subject Category:Representation_theory.
- Dade_isometry type Abstraction100002137.
- Dade_isometry type FiniteGroups.
- Dade_isometry type Group100031264.
- Dade_isometry comment "In mathematical finite group theory, the Dade isometry is an isometry from class functions on a subgroup H with support on a subset K of H to class functions on a group G (Collins 1990, 6.1). It was introduced by Dade (1964) as a generalization and simplification of an isometry used by Feit & Thompson (1963) in their proof of the odd order theorem, and was used by Peterfalvi (2000) in his revision of the character theory of the odd order theorem.".
- Dade_isometry label "Dade isometry".
- Dade_isometry sameAs m.0fp_bhc.
- Dade_isometry sameAs Q5208047.
- Dade_isometry sameAs Q5208047.
- Dade_isometry sameAs Dade_isometry.
- Dade_isometry wasDerivedFrom Dade_isometry?oldid=504987679.
- Dade_isometry isPrimaryTopicOf Dade_isometry.