An algebraization of the notion of topology has been proposed more than 70 years ago in a classical paper by McKinsey and Tarski, leading to an area of research still active today, with connections to algebra, geometry, logic and many applications, in particular, to modal logics. In McKinsey and Tarski's setting the model theoretical notion of homomorphism does not correspond to the notion of continuity. We notice that the two notions correspond if instead we consider a preorder relation \sqsubeseteq defined by \(a \sqsubseteq b\) if a is contained in the topological closure of b, for a, b subsets of some topological space. A specialization poset is a partially ordered set endowed with a further coarser preorder relation \sqsubseteq. We show that every specialization poset can be embedded in the specialization poset naturally associated to some topological space, where the order relation corresponds to set-theoretical inclusion. Specialization semilattices are defined in an analogous way and the corresponding embedding theorem is proved. Specialization semilattices have the amalgamation property. Some basic topological facts and notions are recovered in this apparently very weak setting. The interest of these structures arises from the fact that they also occur in many rather disparate contexts, even far removed from topology.

Lipparini, P. (2024). A Model Theory of Topology. STUDIA LOGICA [10.1007/s11225-024-10107-3].

A Model Theory of Topology

Paolo Lipparini
2024-01-01

Abstract

An algebraization of the notion of topology has been proposed more than 70 years ago in a classical paper by McKinsey and Tarski, leading to an area of research still active today, with connections to algebra, geometry, logic and many applications, in particular, to modal logics. In McKinsey and Tarski's setting the model theoretical notion of homomorphism does not correspond to the notion of continuity. We notice that the two notions correspond if instead we consider a preorder relation \sqsubeseteq defined by \(a \sqsubseteq b\) if a is contained in the topological closure of b, for a, b subsets of some topological space. A specialization poset is a partially ordered set endowed with a further coarser preorder relation \sqsubseteq. We show that every specialization poset can be embedded in the specialization poset naturally associated to some topological space, where the order relation corresponds to set-theoretical inclusion. Specialization semilattices are defined in an analogous way and the corresponding embedding theorem is proved. Specialization semilattices have the amalgamation property. Some basic topological facts and notions are recovered in this apparently very weak setting. The interest of these structures arises from the fact that they also occur in many rather disparate contexts, even far removed from topology.
2024
Online ahead of print
Rilevanza internazionale
Articolo
Esperti anonimi
Settore MATH-02/B - Geometria
Settore MATH-01/A - Logica matematica
English
Con Impact Factor ISI
Model theory of topology
Continuous function
Closure space
Closure poset
Specialization semilattice
https://arxiv.org/abs/2201.00335
Lipparini, P. (2024). A Model Theory of Topology. STUDIA LOGICA [10.1007/s11225-024-10107-3].
Lipparini, P
Articolo su rivista
File in questo prodotto:
Non ci sono file associati a questo prodotto.

I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.

Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/2108/392424
Citazioni
  • ???jsp.display-item.citation.pmc??? ND
  • Scopus 0
  • ???jsp.display-item.citation.isi??? 0
social impact