Space and time via Topological and Tense cylindric algebras

Abstract

Let α be an arbritary ordinal, and 2<n<ω. In 3 accepted for publication in Quaestiones Mathematicae, we studied using algebraic logic, interpolation, amalgamation using α many variables for topological logic with α many variables briefly TopLα. This is a sequel to 3; the second part on modal cylindric algebras, where we study algebraically other properties of TopLα. Modal cylindric algebras are cylindric algebras of infinite dimension expanded with unary modalities inheriting their semantics from a unimodal logic L such as K5 or S4. Using the methodology of algebraic logic, we study topological (when L=S4), in symbols TCAα. We study completeness and omitting types OTTs for TopLω and TenLω, by proving several representability results for locally finite such algebras. Furthermore, we study the notion of atom-canonicity for both TCAn and TenLn, a well known persistence property in modal logic, in connection to OTT for TopLn and TeLCAn, respectively. We study representability, omitting types, interpolation and complexity isssues (such as undecidability) for topological cylindric algebras. In a sequel to this paper, we introduce temporal cyindric algebras and point out the way how to amalgamate algebras of space (topological algebars) and algebras of time (temporal algebras) forming topological-temporal cylindric algebras that lend themselves to encompassing spacetime gemetries, in a purely algebraic manner.