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International Conference on Algebra and its Applications
March 25-28, 1999
Ohio University
Athens, OH, USA

Organizers
Dinh Van Huynh, S.K. Jain, Sergio Lopez-Permouth

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* -polynomial identities of n ×n matrices: the low degrees.
by
Alain D'Amour
Denison University
Coauthors: Michel Racine, University of Ottawa

Let A be an associative algebra with involution * over a field F . Amitsur defined a * -polynomial to be a polynomial where the variables can also appear with a * ; such polynomials can be evaluated on associative algebras with involution in the obvious way. Unlike ordinary identities, * -identities are not well-understood; for instance, an Amitsur-Levitzki type of result has not yet been established. When A = Mn(F), the n ×n matrices with entries in F, the ideal I(Mn(F), * ) of * - identities coincides with either I(Mn(F), t) for t the transpose involution or I(Mn(F), s) for s the symplectic involution (n even). In both cases, the question of what is the minimal degree of a * -polynomial identity is still open. We investigate the case where n < 5.

Date received: November 16, 1998

Copyright © 1998 by the author(s). The author(s) of this document and the organizers of the conference have granted their consent to include this abstract in Atlas Conferences Inc. Document # cabw-27.