Definable principal congruences and solvability

, , &
Annals of Pure and Applied Logic 157 (1):30-49 (2009)
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Abstract

We prove that in a locally finite variety that has definable principal congruences , solvable congruences are nilpotent, and strongly solvable congruences are strongly abelian. As a corollary of the arguments we obtain that in a congruence modular variety with DPC, every solvable algebra can be decomposed as a direct product of nilpotent algebras of prime power size

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10.1016/j.apal.2008.09.019

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