m-Endoregular lattices

Abstract

In a previous work, (dual)-m-Rickart lattices were studied. Now, in this paper, we introduce m-endoregular lattices as those lattices L such that m is a regular monoid, where m is a submonoid with zero of Endlin(L). We show that these lattices can be characterized in terms of m-Rickart and m-dual-Rickart lattices. Also, we compare these new lattices with those lattices in which every compact element is a complement. We characterize the m-endoregular lattices such that every idempotent in m is central in m and we show that for these lattices the complements are a sublattice which is a Boolean algebra. We introduce two new concepts, m-K-extending and m-T-lifting lattices. For these lattices, we show that the monoid m has a regular quotient monoid provided they satisfy m-C2 and m-D2 respectively.