An infinite stratum of representability; some cylindric algebras are more representable than others

Abstract

Let 2<n<m≤ ω. Let n denote the class of cylindric algebras of dimension n and n denote the class of representable ns. We say that ∈ n is representable up to m if has an m-square representation. An m square represenation is locally relativized represenation that is classical locally only on so called m-squares'. Roughly if we zoom in by a movable window to an m square representation, there will become a point determinded and depending on m where we mistake the m square-representation for a genuine classical one. When we zoom out the non-representable part gets more exposed. For 2<n<m<l≤ ω, an l square represenation is m-square; the converse however is not true. The variety n is a limiting case coinciding with ns having ω-square representations. Let nm be the class of algebras representable up to m. We show that nm+1⊂neq nm for m≥ n+2.