Simple and sub-directly irreducible double Boolean algebras
Abstract
Double Boolean algebras are algebras D=(D;,,,,,) of type (2,2,1,1,0,0) introduced by Rudolf Wille to capture the equational theory of the algebra of protoconcepts. Every double Boolean algebra D contains two Boolean algebras denoted by D and D. A double Boolean algebra D is said pure if D=D D, and trivial if =. In this work, we first show that a double Boolean algebra is pure and trivial if and only if it is a glued sum of two Boolean algebras; secondly, we characterize simple double Boolean algebras; and finally, we determine up to isomorphism all sub-directly irreducible algebras of some sub-classes of the variety of double Boolean algebras.
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