Abstract
This paper is dedicated to Newton da Costa, who,among his many achievements, was the first toaim at dualising intuitionism in order to produce paraconsistent logics,the C-systems. This paper similarly dualises intuitionism to aparaconsistent logic, but the dual is a different logic, namely closed setlogic. We study the interaction between the properties of topologicalspaces, particularly separation properties, and logical theories on thosespaces. The paper begins with a brief survey of what is known about therelation between topology and modal logic, intuitionist logic and paraconsistentlogic in respect of the incompleteness and inconsistency of theories.Necessary and sufficient conditions which relate the T 1-property to theproperties of logical theories, are obtained. The result is then extendedto Hausdorff and Normal spaces. In the final section these methods areused to vary the modelling conditions for identity.
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References
Mortensen, Chris: 1995, Inconsistent Mathematics, Kluwer, Dordrecht.
Simmons, G. F.: 1963, Introduction to Topology and Modern Analysis, McGraw-Hill, Kogakusha, Tokyo.
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Mortensen, C. Topological Separation Principles And Logical Theories. Synthese 125, 169–178 (2000). https://doi.org/10.1023/A:1005263111635
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DOI: https://doi.org/10.1023/A:1005263111635