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https://doi.org/10.1080/00927879808826259
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Cite Journal: Communications in Algebra |  Publication Date: Jan 1, 1998 |
 Citations: 8 |
In this paper we prove that if (A, ω) is a Bernstein algebra or a train algebra of rank 3, then the bar-radical of (A,ω) is (bar(A))2and that it is nilpotent (hence solvable). We give also a description of a class of train algebras of rank 3, defined by pairs of bilinear mappings.
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