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Azumaya Algebras with Involution, Polarizations, and Linear Generalized Identities

✍ Scribed by L. Rowen

Publisher: Elsevier Science
Year: 1995
Tongue: English
Weight: 534 KB
Volume: 178
Category: Article
ISSN: 0021-8693
DOI: 10.1006/jabr.1995.1358

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✦ Synopsis

An algebra (R) with anti-isomorphism ( ({ }^{}) ) is shown to be Azumaya if () is given by an element of (R \otimes R^{\text {op }}); in particular, this is the case if the canonical map (R \otimes_{C} R^{\text {op }} \rightarrow \operatorname{End}_{C}(R)) is onto. Consequently, the existence of a strict polarization often implies that an algebra is Azumaya. On the other hand, all simple rings have polarizations, and algebras with involution of the second kind have polarizations. These results are obtained via the theory of generalized polynomial identities. 1995 Academic Press. Inc.

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