Kauta, John S. (2012) Hereditary orders in the quotient ring of a skew polynomial ring. Proceedings of the American Mathematical Society, 140 (5). pp. 1473-1481. ISSN 0002-9939
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Abstract
Let K be a field, and let σ be an automorphism of K of finite order. Let K(X; σ) be the quotient ring of the skew polynomial ring K[X; σ]. Then any order in K(X; σ) which contains K and its center is a valuation ring of the center of K(X; σ) is a crossed-product algebra Af, where f is some normalized 2-cocycle. Associated to f is a subgroup H of [σ] and a graph. In this paper, we determine the connections between hereditary-ness and maximal order properties of Af and the properties of H, f and the graph of f.
Item Type: | Journal Article |
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Subjects: | Q Science > QA Mathematics |
Divisions: | Faculty of Science, Technology and Environment (FSTE) > School of Computing, Information and Mathematical Sciences |
Depositing User: | John Kauta |
Date Deposited: | 05 Nov 2013 23:00 |
Last Modified: | 01 Aug 2016 23:48 |
URI: | https://repository.usp.ac.fj/id/eprint/7015 |
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