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This article is cited in 7 scientific papers (total in 7 papers)
Dynamic mereotopology. III. Whiteheadean type of integrated point-free theories of space and time. I
D. Vakarelov Sofia University, Faculty of mathematics and informatics, Department of mathematical logic and applications, Blvd James Bourchier 5, Sofia, Bulgaria
Abstract:
Some Whiteheadean type point-free theories of space and time are presented. Here the term point-free means that neither space points nor time moments are assumed as primitives. The theory has an algebraic formulation, called dynamic contact algebra (DCA), which is a Boolean algebra whose elements symbolize dynamic regions changing in time, with several spatiotemporal relations between the regions: space contact, time contact, preceding, and some others. In the second part of the work, a class of intended standard models of DCAs of topological kind will be introduced, which is a reason for calling DCAs dynamic mereotopologies. The main result of the paper is a kind of representation theorem saying that each DCA in a given class of DCAs is isomorphic to some DCA of standard type in the same class (see the third part of the work). The first part contains a historical introduction and some facts on static mereotopology needed in succeeding parts – namely, the definitions of contact and precontact algebras, their models and representation theory.
Keywords:
Whiteheadean type theory, dynamic mereotopology, pointfree theory of space and time.
Received: 01.11.2013
Citation:
D. Vakarelov, “Dynamic mereotopology. III. Whiteheadean type of integrated point-free theories of space and time. I”, Algebra Logika, 53:3 (2014), 300–322; Algebra and Logic, 53:3 (2014), 191–205
Linking options:
https://www.mathnet.ru/eng/al637 https://www.mathnet.ru/eng/al/v53/i3/p300
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Abstract page: | 343 | Full-text PDF : | 88 | References: | 50 | First page: | 4 |
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