Mathematics – Rings and Algebras
Scientific paper
2010-08-13
Mathematics
Rings and Algebras
Several corrections made to Section 3. Final version, to appear in Comm. Algebra
Scientific paper
Let $K$ be a perfect field and let $k \subset K$ be a subfield. In previous work of the second author and C. Pappacena, left finite dimensional simple two-sided $k$-central vector spaces over $K$ were classified by arithmetic data associated to the extension $K/k$. In this paper, we continue to study the relationship between simple two-sided vector spaces and their associated arithmetic data. In particular, we determine which arithmetic data corresponds to simple two-sided vector spaces with the same left and right dimension, and we determine the arithmetic data associated to the left and right dual of a simple two-sided vector space. As an immediate application, we prove the existence of the non-commutative symmetric algebra of any $k$-central two-sided vector space over $K$ which has the same left and right dimension.
Hart James
Nyman Adam
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