Expanding the Reals by Continuous Functions Adds No Computational Power

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Journal of Symbolic Logic 88 (3):1083-1102 (2023)
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Abstract

We study the relative computational power of structures related to the ordered field of reals, specifically using the notion of generic Muchnik reducibility. We show that any expansion of the reals by a continuous function has no more computing power than the reals, answering a question of Igusa, Knight, and Schweber [7]. On the other hand, we show that there is a certain Borel expansion of the reals that is strictly more powerful than the reals and such that any Borel quotient of the reals reduces to it.

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10.1017/jsl.2022.66

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References found in this work

The problem of predicativity.Joseph R. Shoenfield - 1961 - In Bar-Hillel, Yehoshua & [From Old Catalog] (eds.), Essays on the Foundations of Mathematics. Jerusalem,: Magnes Press. pp. 132--139.
A fixed point for the jump operator on structures.Antonio Montalbán - 2013 - Journal of Symbolic Logic 78 (2):425-438.
Comparing two versions of the reals.G. Igusa & J. F. Knight - 2016 - Journal of Symbolic Logic 81 (3):1115-1123.

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