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On the Homogeneous Countable Boolean Contact Algebra
Logic and Logical Philosophy 22 (2):213-251 (2013)
Abstract
In a recent paper, we have shown that the class of Boolean contact algebras (BCAs) has the hereditary property, the joint embedding property and the amalgamation property. By Fraïssé’s theorem, this shows that there is a unique countable homogeneous BCA. This paper investigates this algebra and the relation algebra generated by its contact relation. We first show that the algebra can be partitioned into four sets {0}, {1}, K, and L, which are the only orbits of the group of base automorphisms of the algebra, and then show that the contact relation algebra of this algebra is finite, which is the first non-trivial extensional BCA we know which has this propertyOther Versions
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Citations of this work
Solving infinite-domain CSPs using the patchwork property.Konrad K. Dabrowski, Peter Jonsson, Sebastian Ordyniak & George Osipov - 2023 - Artificial Intelligence 317 (C):103880.
References found in this work
A calculus of individuals based on "connection".Bowman L. Clarke - 1981 - Notre Dame Journal of Formal Logic 22 (3):204-218.
Point, line, and surface, as sets of solids.Theodore de Laguna - 1922 - Journal of Philosophy 19 (17):449-461.
Axiomatizability of geometry without points.Andrzej Grzegorczyk - 1960 - Synthese 12 (2-3):228 - 235.
Boolean connection algebras: A new approach to the Region-Connection Calculus.J. G. Stell - 2000 - Artificial Intelligence 122 (1-2):111-136.
Region Connection Calculus: Its models and composition table.Sanjiang Li & Mingsheng Ying - 2003 - Artificial Intelligence 145 (1-2):121-146.
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