Mathematical Logic Quarterly 44 (3):344-348 (1998)

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Abstract
We show that true first-order arithmetic of the positive integers is interpretable over the real-algebraic structure of Scott's topological model for intuitionistic analysis. From this the undecidability of the structure follows
Keywords Undecidability  Topological model  Intuitionism  True first order arithmetic
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DOI 10.1002/malq.19980440305
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