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Truth in the limit
2016
Reports on Mathematical Logic
We consider sl-semantics in which first order sentences are interpreted in potentially infinite domains. A potentially infinite domain is a growing sequence of finite models. We prove the completeness theorem for first order logic under this semantics. Additionally we characterize the logic of such domains as having a learnable, but not recursive, set of axioms. The work is a part of author's research devoted to computationally motivated foundations of mathematics.
dblp:journals/rml/Mostowski16
fatcat:ihzpcvjv6zgwbkyfoqr3kktlx4