Term inequalities in finite algebras

Abstract

Given an algebra A, and terms s(x1,x2,… xk) and t(x1,x2,… xk) of the language of A, we say that s and t are separated in A iff for all a1,a2… ak∈ A, s(a1,a2,… ak) and t(a1,a2,… ak) are never equal. We prove that given two terms that are separated in any algebra, there exists a finite algebra in which they are separated. As a corollary, we obtain that whenever the sentence σ is a universally quantified conjunction of negated atomic formulas, σ is consistent iff it has a finite model.