Logical Methods in Computer Science (Feb 2020)

Continuous Regular Functions

  • Alexi Block Gorman,
  • Philipp Hieronymi,
  • Elliot Kaplan,
  • Ruoyu Meng,
  • Erik Walsberg,
  • Zihe Wang,
  • Ziqin Xiong,
  • Hongru Yang

DOI
https://doi.org/10.23638/LMCS-16(1:17)2020
Journal volume & issue
Vol. Volume 16, Issue 1

Abstract

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Following Chaudhuri, Sankaranarayanan, and Vardi, we say that a function $f:[0,1] \to [0,1]$ is $r$-regular if there is a B\"{u}chi automaton that accepts precisely the set of base $r \in \mathbb{N}$ representations of elements of the graph of $f$. We show that a continuous $r$-regular function $f$ is locally affine away from a nowhere dense, Lebesgue null, subset of $[0,1]$. As a corollary we establish that every differentiable $r$-regular function is affine. It follows that checking whether an $r$-regular function is differentiable is in $\operatorname{PSPACE}$. Our proofs rely crucially on connections between automata theory and metric geometry developed by Charlier, Leroy, and Rigo.

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