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On the theory of exponential integer parts

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2026

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ZML: Zeitschrift für Mathematische Logik und Grundlagen der Mathematik

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We axiomatize the first-order theories of exponential integer parts of real-closed exponential fields in a language with $2^x$, in a language with a predicate for powers of $2$, and in the basic language of ordered rings. In particular, the last theory extends $\mathsf{IOpen}$ by sentences expressing the existence of winning strategies in a certain game on integers; we show that it is a proper extension of $\mathsf{IOpen}$, and give upper and lower bounds on the required number of rounds needed to win the game.

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Emil Jeřábek. "On the theory of exponential integer parts." Zeitschrift für Mathematische Logik und Grundlagen der Mathematik, Vol. 72 (2026), pp. 175–196. DOI: 10.60866/CAM.259

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