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- Commutant-associative_algebra abstract "In abstract algebra, a commutant-associative algebra is a nonassociative algebra over a field whose multiplication satisfies the following axiom:,where [A, B] = AB − BA is the commutator of A and B and(A, B, C) = (AB)C – A(BC) is the associator of A, B and C.In other words, an algebra M is commutant-associative if the commutant, i.e. the subalgebra of M generated by all commutators [A, B], is an associative algebra.".
- Commutant-associative_algebra wikiPageExternalLink books?id=pHK11tfdE3QC&dq=V.E.+Tarasov+Quantum+Mechanics+of+Non-Hamiltonian+and+Dissipative+Systems.&printsec=frontcover&source=bl&ots=qDERzjAJd9&sig=U8V7RUVd1SW8mx4GzE1T-2canhA&hl=ru&ei=pkvkSeycINiEsAbloKSfCw&sa=X&oi=book_result&ct=result&resnum=1.
- Commutant-associative_algebra wikiPageExternalLink archive.phtml?wshow=paper&jrnid=tmf&paperid=962&option_lang=eng.
- Commutant-associative_algebra wikiPageID "22404166".
- Commutant-associative_algebra wikiPageRevisionID "556381592".
- Commutant-associative_algebra author "V.T. Filippov".
- Commutant-associative_algebra first "K.A.".
- Commutant-associative_algebra hasPhotoCollection Commutant-associative_algebra.
- Commutant-associative_algebra id "A/a012090".
- Commutant-associative_algebra id "M/m062170".
- Commutant-associative_algebra last "Zhevlakov".
- Commutant-associative_algebra title "Alternative rings and algebras".
- Commutant-associative_algebra title "Mal'tsev algebra".
- Commutant-associative_algebra subject Category:Non-associative_algebras.
- Commutant-associative_algebra type Abstraction100002137.
- Commutant-associative_algebra type Algebra106012726.
- Commutant-associative_algebra type Cognition100023271.
- Commutant-associative_algebra type Content105809192.
- Commutant-associative_algebra type Discipline105996646.
- Commutant-associative_algebra type KnowledgeDomain105999266.
- Commutant-associative_algebra type Mathematics106000644.
- Commutant-associative_algebra type NonassociativeAlgebras.
- Commutant-associative_algebra type PsychologicalFeature100023100.
- Commutant-associative_algebra type PureMathematics106003682.
- Commutant-associative_algebra type Science105999797.
- Commutant-associative_algebra comment "In abstract algebra, a commutant-associative algebra is a nonassociative algebra over a field whose multiplication satisfies the following axiom:,where [A, B] = AB − BA is the commutator of A and B and(A, B, C) = (AB)C – A(BC) is the associator of A, B and C.In other words, an algebra M is commutant-associative if the commutant, i.e. the subalgebra of M generated by all commutators [A, B], is an associative algebra.".
- Commutant-associative_algebra label "Commutant-associative algebra".
- Commutant-associative_algebra label "Коммутантно-ассоциативная алгебра".
- Commutant-associative_algebra sameAs m.05s_xvm.
- Commutant-associative_algebra sameAs Q4229947.
- Commutant-associative_algebra sameAs Q4229947.
- Commutant-associative_algebra sameAs Commutant-associative_algebra.
- Commutant-associative_algebra wasDerivedFrom Commutant-associative_algebra?oldid=556381592.
- Commutant-associative_algebra isPrimaryTopicOf Commutant-associative_algebra.