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- Zappa–Szép_product abstract "In mathematics, especially group theory, the Zappa–Szép product (also known as the Zappa–Rédei-Szép product, general product, knit product or exact factorization) describes a way in which a group can be constructed from two subgroups. It is a generalization of the direct and semidirect products. It is named after Guido Zappa (1940) and Jenő Szép (1950) although it was independently studied by others including B.H. Neumann (1935), G.A. Miller (1935), and J.A. de Séguier (1904).".
- Zappa–Szép_product wikiPageID "7094111".
- Zappa–Szép_product wikiPageLength "7786".
- Zappa–Szép_product wikiPageOutDegree "29".
- Zappa–Szép_product wikiPageRevisionID "678395922".
- Zappa–Szép_product wikiPageWikiLink Bijection.
- Zappa–Szép_product wikiPageWikiLink Cartesian_product.
- Zappa–Szép_product wikiPageWikiLink Category:Group_theory.
- Zappa–Szép_product wikiPageWikiLink Complex_number.
- Zappa–Szép_product wikiPageWikiLink Diagonal.
- Zappa–Szép_product wikiPageWikiLink Direct_product_of_groups.
- Zappa–Szép_product wikiPageWikiLink General_linear_group.
- Zappa–Szép_product wikiPageWikiLink Group_(mathematics).
- Zappa–Szép_product wikiPageWikiLink Group_isomorphism.
- Zappa–Szép_product wikiPageWikiLink Group_theory.
- Zappa–Szép_product wikiPageWikiLink Guido_Zappa.
- Zappa–Szép_product wikiPageWikiLink Hall_subgroup.
- Zappa–Szép_product wikiPageWikiLink Identity_element.
- Zappa–Szép_product wikiPageWikiLink Invertible_matrix.
- Zappa–Szép_product wikiPageWikiLink Jenő_Szép.
- Zappa–Szép_product wikiPageWikiLink Map_(mathematics).
- Zappa–Szép_product wikiPageWikiLink Mathematics.
- Zappa–Szép_product wikiPageWikiLink Matrix_(mathematics).
- Zappa–Szép_product wikiPageWikiLink Normal_subgroup.
- Zappa–Szép_product wikiPageWikiLink QR_decomposition.
- Zappa–Szép_product wikiPageWikiLink Real_number.
- Zappa–Szép_product wikiPageWikiLink Semidirect_product.
- Zappa–Szép_product wikiPageWikiLink Sign_(mathematics).
- Zappa–Szép_product wikiPageWikiLink Springer_Science+Business_Media.
- Zappa–Szép_product wikiPageWikiLink Subgroup.
- Zappa–Szép_product wikiPageWikiLink Subset.
- Zappa–Szép_product wikiPageWikiLink Triangular_matrix.
- Zappa–Szép_product wikiPageWikiLink Unitary_group.
- Zappa–Szép_product wikiPageWikiLink Unitary_matrix.
- Zappa–Szép_product wikiPageWikiLinkText "Zappa–Szép product".
- Zappa–Szép_product wikiPageWikiLinkText "exact factorization".
- Zappa–Szép_product wikiPageUsesTemplate Template:Citation.
- Zappa–Szép_product wikiPageUsesTemplate Template:Cite_journal.
- Zappa–Szép_product wikiPageUsesTemplate Template:Mapsto.
- Zappa–Szép_product wikiPageUsesTemplate Template:Reflist.
- Zappa–Szép_product subject Category:Group_theory.
- Zappa–Szép_product type Diacritic.
- Zappa–Szép_product type Redirect.
- Zappa–Szép_product comment "In mathematics, especially group theory, the Zappa–Szép product (also known as the Zappa–Rédei-Szép product, general product, knit product or exact factorization) describes a way in which a group can be constructed from two subgroups. It is a generalization of the direct and semidirect products. It is named after Guido Zappa (1940) and Jenő Szép (1950) although it was independently studied by others including B.H. Neumann (1935), G.A. Miller (1935), and J.A. de Séguier (1904).".
- Zappa–Szép_product label "Zappa–Szép product".
- Zappa–Szép_product sameAs Q17104770.
- Zappa–Szép_product sameAs m.0h3vhk.
- Zappa–Szép_product sameAs Q17104770.
- Zappa–Szép_product wasDerivedFrom Zappa–Szép_product?oldid=678395922.
- Zappa–Szép_product isPrimaryTopicOf Zappa–Szép_product.