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- Regevs_theorem abstract "In abstract algebra, Regev's theorem, proved by Amitai Regev (1971, 1972), states that the tensor product of two PI algebras is a PI algebra.".
- Regevs_theorem wikiPageExternalLink 1183533194.
- Regevs_theorem wikiPageID "31883149".
- Regevs_theorem wikiPageLength "888".
- Regevs_theorem wikiPageOutDegree "6".
- Regevs_theorem wikiPageRevisionID "634858546".
- Regevs_theorem wikiPageWikiLink Abstract_algebra.
- Regevs_theorem wikiPageWikiLink Bulletin_of_the_American_Mathematical_Society.
- Regevs_theorem wikiPageWikiLink Category:Ring_theory.
- Regevs_theorem wikiPageWikiLink Category:Theorems_in_abstract_algebra.
- Regevs_theorem wikiPageWikiLink Polynomial_identity_ring.
- Regevs_theorem wikiPageWikiLink Tensor_product.
- Regevs_theorem wikiPageWikiLinkText "Regev's theorem".
- Regevs_theorem authorlink "Amitai Regev".
- Regevs_theorem first "Amitai".
- Regevs_theorem last "Regev".
- Regevs_theorem wikiPageUsesTemplate Template:Abstract-algebra-stub.
- Regevs_theorem wikiPageUsesTemplate Template:Citation.
- Regevs_theorem wikiPageUsesTemplate Template:Harvs.
- Regevs_theorem year "1971".
- Regevs_theorem year "1972".
- Regevs_theorem subject Category:Ring_theory.
- Regevs_theorem subject Category:Theorems_in_abstract_algebra.
- Regevs_theorem hypernym Algebra.
- Regevs_theorem type Theorem.
- Regevs_theorem comment "In abstract algebra, Regev's theorem, proved by Amitai Regev (1971, 1972), states that the tensor product of two PI algebras is a PI algebra.".
- Regevs_theorem label "Regev's theorem".
- Regevs_theorem sameAs Q7308146.
- Regevs_theorem sameAs m.0gvrvwz.
- Regevs_theorem sameAs Regevs_sats.
- Regevs_theorem sameAs Q7308146.
- Regevs_theorem wasDerivedFrom Regevs_theorem?oldid=634858546.
- Regevs_theorem isPrimaryTopicOf Regevs_theorem.