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- Gassmann_triple abstract "In mathematics, a Gassmann triple (or Gassmann-Sunada triple) is a group G together with two faithful actions on sets X and Y, such that X and Y are not isomorphic as G-sets but every element of G has the same number of fixed points on X and Y. They were introduced by Fritz Gassmann in 1926.".
- Gassmann_triple thumbnail Fano_plane.svg?width=300.
- Gassmann_triple wikiPageID "33694090".
- Gassmann_triple wikiPageLength "2312".
- Gassmann_triple wikiPageOutDegree "16".
- Gassmann_triple wikiPageRevisionID "633177739".
- Gassmann_triple wikiPageWikiLink Arithmetically_equivalent_number_fields.
- Gassmann_triple wikiPageWikiLink Category:Permutation_groups.
- Gassmann_triple wikiPageWikiLink Dedekind_zeta_function.
- Gassmann_triple wikiPageWikiLink Fano_plane.
- Gassmann_triple wikiPageWikiLink Fixed_point_(mathematics).
- Gassmann_triple wikiPageWikiLink Fritz_Gassmann.
- Gassmann_triple wikiPageWikiLink Group_(mathematics).
- Gassmann_triple wikiPageWikiLink Group_action.
- Gassmann_triple wikiPageWikiLink Hearing_the_shape_of_a_drum.
- Gassmann_triple wikiPageWikiLink Isomorphism.
- Gassmann_triple wikiPageWikiLink Isospectral_Riemannian_manifolds.
- Gassmann_triple wikiPageWikiLink Isospectral_graphs.
- Gassmann_triple wikiPageWikiLink Mathematische_Zeitschrift.
- Gassmann_triple wikiPageWikiLink PSL(2,7).
- Gassmann_triple wikiPageWikiLink Set_(mathematics).
- Gassmann_triple wikiPageWikiLink Simple_group.
- Gassmann_triple wikiPageWikiLink Spectral_graph_theory.
- Gassmann_triple wikiPageWikiLink Springer-Verlag.
- Gassmann_triple wikiPageWikiLink Springer_Science+Business_Media.
- Gassmann_triple wikiPageWikiLink File:Fano_plane.svg.
- Gassmann_triple wikiPageWikiLinkText "Gassmann triple".
- Gassmann_triple hasPhotoCollection Gassmann_triple.
- Gassmann_triple wikiPageUsesTemplate Template:Citation.
- Gassmann_triple subject Category:Permutation_groups.
- Gassmann_triple hypernym G.
- Gassmann_triple type Device.
- Gassmann_triple comment "In mathematics, a Gassmann triple (or Gassmann-Sunada triple) is a group G together with two faithful actions on sets X and Y, such that X and Y are not isomorphic as G-sets but every element of G has the same number of fixed points on X and Y. They were introduced by Fritz Gassmann in 1926.".
- Gassmann_triple label "Gassmann triple".
- Gassmann_triple sameAs m.0hhr3sw.
- Gassmann_triple sameAs Q5526661.
- Gassmann_triple sameAs Q5526661.
- Gassmann_triple wasDerivedFrom Gassmann_triple?oldid=633177739.
- Gassmann_triple depiction Fano_plane.svg.
- Gassmann_triple isPrimaryTopicOf Gassmann_triple.