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Continuous Lattices and Whiteheadian Theory of Space
Logic and Logical Philosophy 6:35 - 54 (1998)
Abstract
In this paper a solution of Whitehead’s problem is presented: Starting with a purely mereological system of regions a topological space is constructed such that the class of regions is isomorphic to the Boolean lattice of regular open sets of that space. This construction may be considered as a generalized completion in analogy to the well-known Dedekind completion of the rational numbers yielding the real numbers . The argument of the paper relies on the theories of continuous lattices and “pointless” topology..
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Citations of this work
A Proximity Approach to Some Region-Based Theories of Space.Dimiter Vakarelov, Georgi Dimov, Ivo Düntsch & Brandon Bennett - 2002 - Journal of Applied Non-Classical Logics 12 (3-4):527-559.
New Work for Carnap’s Quasi-Analysis.Thomas Mormann - 2009 - Journal of Philosophical Logic 38 (3):249-282.
Dynamic logics of the region-based theory of discrete spaces.Philippe Balbiani, Tinko Tinchev & Dimiter Vakarelov - 2007 - Journal of Applied Non-Classical Logics 17 (1):39-61.
Mathematical Methods in Region-Based Theories of Space: The Case of Whitehead Points.Rafał Gruszczyński - 2024 - Bulletin of the Section of Logic 53 (1):63-104.
Complementation in Representable Theories of Region-Based Space.Torsten Hahmann & Michael Grüninger - 2013 - Notre Dame Journal of Formal Logic 54 (2):177-214.
References found in this work
The theory of Representations for Boolean Algebras.M. H. Stone - 1936 - Journal of Symbolic Logic 1 (3):118-119.
A calculus of individuals based on "connection".Bowman L. Clarke - 1981 - Notre Dame Journal of Formal Logic 22 (3):204-218.
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