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| Vol.18, Issue.4 | | Pages
MULTIPLICATIVE PRIMENESS OF COMPLEXIFICATION FOR REAL ALGEBRAS
We say that an algebra a is multiplicative prime if both a and m(a) ( the multiplication algebra of a) are prime . in this paper , we study the transitivity of the property of multiplicative primeness for real normal algebra when one take the process of the complexification of such real algebra . we prove that if a is a real normal multiplication of a is also multiplicatively prime normed algebra .
Original Text (This is the original text for your reference.)
MULTIPLICATIVE PRIMENESS OF COMPLEXIFICATION FOR REAL ALGEBRAS
We say that an algebra a is multiplicative prime if both a and m(a) ( the multiplication algebra of a) are prime . in this paper , we study the transitivity of the property of multiplicative primeness for real normal algebra when one take the process of the complexification of such real algebra . we prove that if a is a real normal multiplication of a is also multiplicatively prime normed algebra .
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complexification multiplicative primeness real normal multiplication of multiplication algebra
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Amir A. Mohammed,Baida S.Abdullah,.MULTIPLICATIVE PRIMENESS OF COMPLEXIFICATION FOR REAL ALGEBRAS. 18 (4),.
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