Order in Implication Zroupoids

Abstract

The variety I of implication zroupoids was defined and investigated by Sankappanavar ([7]) as a generalization of De Morgan algebras. Also, in [7], several new subvarieties of I were introduced, including the subvariety I2,0, defined by the identity: x" ≈ x, which plays a crucial role in this paper. Several more new subvarieties of I, including the subvariety SL of semilattices with a least element 0, are studied in [3], and an explicit description of semisimple subvarieties of I is given in [5]. It is well known that the operation induces a partial order () in the variety SL and also in the variety DM of De Morgan algebras. As both SL and DM are subvarieties of I and the definition of partial order can be expressed in terms of the implication and the constant, it is but natural to ask whether the relation (now defined) on I is actually a partial order in some (larger) subvariety of I that includes SL and DM. The purpose of the present paper is two-fold: Firstly, a complete answer is given to the above mentioned problem. Indeed, our first main theorem shows that the variety I2,0 is a maximal subvariety of I with respect to the property that the relation is a partial order on its members. In view of this result, one is then naturally led to consider the problem of determining the number of non-isomorphic algebras in I2,0 that can be defined on an n-element chain (herein called I2,0-chains), n being a natural number. Secondly, we answer this problem in our second main theorem, which says that, for each n ∈ N, there are exactly n nonisomorphic I2,0-chains of size n.