Atom-canonicity and complete representations for cylindric-like algebras, and omitting types for the clque guarded fragment of first order logic

Abstract

Fix a finite ordinal n>2. We show that there exists an atomic, simple and countable representable CAn, such that its minimal completion is outside SNrnCAn+3. Hence, for any finite k≥ 3, the variety SNrnCAn+k is not atom-canonical, so that the variety of CAn's having n+k-flat representations is not atom-canonical, too. We show, for finite k≥ 3, that ScNrnCAn+k is not elementary, hence the class of CAn's having complete n+3-smooth representations is not elementary. We obtain analogous results by replacing flat and smooth, respectively, by (the weaker notion of) square; this give a stronger result in both cases and here we can allow k to be infinite. Our results are proved using rainbow constructions for CA's. We lift the negative result on atom-canonicity to the transfinite. We also show that for any ordinal α≥ ω, for any finite k≥ 1, and for any r∈ ω, there exists an atomic algebra Ar∈ SNrαCAα+k SNrnCAα+k+1, such that r/U Ar∈ RCAα where U is any non--principal ultrafilter on ω. Reaping the harvest of our algebraic results we investigate a plethora of omitting types theorems for variants of first logic including its finite variable fragments and its packed fragment.