Limit varieties of aperiodic monoids
Abstract
A limit variety is a variety that is minimal with respect to being non-finitely based. We present a new limit variety of aperiodic monoid. We also show that if there exists any other limit variety of aperiodic monoids, then it is contained in the joint of the variety B1 of all idempotent monoids and certain finitely generated variety E1 with B1 E1 = L21, where L21 is the variety of left-zero monoids. Jackson and Lee proved that E1 is HFB, that is, its every subvariety is finitely based. We exend this result a step up the classical decomposition B1=i 2 L1i by showing that E1 E1 L13 is also HFB, where E1 is the variety dual of E1.
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