The General Apple Property and Boolean terms in Integral Bounded Residuated Lattice-ordered Commutative Monoids

Abstract

In this paper we give equational presentations of the varieties of integral bounded residuated lattice-ordered commutative monoids (bounded residuated lattices for short) satisfying the General Apple Property (GAP), that is, varieties in which all of its directly indecomposable members are local. This characterization is given by means of Boolean terms: A variety V of s has GAP iff there is an unary term b(x) such that V satisfies the equations b(x) b(x)≈ and (xk b(x))·(b(x) k.x)≈ , for some k>0. Using this characterization, we show that for any variety V of bounded residuated lattice satisfying GAP there is k>0 such that the equation k.x k. x≈ holds in V, that is, V ⊂eq WLk. As a consequence we improve Theorem 5.7 of CT12, showing in theorem that a variety of \ has Boolean retraction term if and only if there is k>0 such that it satisfies the equation k.xk k.( x)k≈. We also see that in Bounded residuated lattices GAP is equivalent to Boolean lifting property (BLP) and so, it is equivalent to quasi-local property (in the sense of GLM12). Finally, we prove that a variety of s has GAP and its semisimple members form a variety if and only if there exists an unary term which is simultaneously Boolean and radical for this variety.