Experimenting with the Identity (xy)z = y(zx)
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1993-09-01
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Hentzel, Irvin
Professor Emeritus
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Mathematics
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Abstract
An experiment with the nonassociative algebra program Albert led to the discovery of the following surprising theorem. Let G be a groupoid satisfying the identity (xy)z = y(zx). Then for products in G involving at least five elements, all factors commute and associate. A corollary is that any semiprime ring satisfying this identity must be commutative and associative, generalizing a known result of Chen.
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This article is published as Hentzel, Irvin Roy, David P. Jacobs, and Sekhar V. Muddana. "Experimenting with the identity (xy) z= y (zx)." Journal of symbolic computation 16, no. 3 (1993): 289-293. 10.1006/jsco.1993.1047. Posted with permission.
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Fri Jan 01 00:00:00 UTC 1993