Varieties of Demi-Pseudocomplemented Lattices

In this paper we characterize the join irreducible elements of the free algebras on n free generators in the subvarieties of the variety VO of pseudocomplemented De Morgan algebras satisfying the identity zz'\* = (zz'\*)'\*.

This paper is concerned with the question whether the lattice sum (join) V $ V' of two finitely based lattice varieties V and V' is finitely based. An example is constructed showing that this is not always the case. On the other hand, it is proved that if V C M and (V')\* = (N)', then V + V' is fin

Cet article pr6sente la construction de nombreux treillis semi-modulaires au moyen du produit tensoriel de demi-treillis. Les treillis obtenus sont de la forme M3 ® B o~ B est un treillis modulaire born6. I1 est montr6 clue lorsque B d6crit une classe 6quatiormeUe K de treillis modulaires alors M a

Let V be a discriminator variety such that the class B=[A # V: A is simple and has no trivial subalgebra] is closed under ultraproducts. This property holds, for example, if V is locally finite or if the language is finite. Let v(V) and q(V) denote the lattice of subvarieties and subquasivarieties o