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Mereology on Topological and Convergence Spaces
Notre Dame Journal of Formal Logic 54 (1):21-31 (2013)
Abstract
We show that a standard axiomatization of mereology is equivalent to the condition that a topological space is discrete, and consequently, any model of general extensional mereology is indistinguishable from a model of set theory. We generalize these results to the Cartesian closed category of convergence spacesLinks
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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.
A Spatial Logic Based on Regions and Connection.David Randell, Cui A., Cohn Zhan & G. Anthony - 1992 - KR 92:165--176.
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