English

Reverse Engineered Diophantine Equations over $\mathbb{Q}$

Number Theory 2024-11-01 v1

Abstract

Let PQ={αn  :  αQ,  n2}\mathscr{P}_\mathbb{Q}=\{ \alpha^n \; : \; \alpha \in \mathbb{Q}, \; n \ge 2\} be the set of rational perfect powers, and let SPQS \subseteq \mathscr{P}_\mathbb{Q} be a finite subset. We prove the existence of a polynomial fSZ[X]f_S \in \mathbb{Z}[X] such that f(Q)PQ=Sf(\mathbb{Q}) \cap \mathscr{P}_\mathbb{Q}=S. This generalizes a recent theorem of Gajovi\'{c} who recently proved a similar theorem for finite subsets of integer perfect powers. Our approach makes use of the resolution of the generalized Fermat equation of signature (2,4,n)(2,4,n) due to Ellenberg and others, as well as the finiteness of perfect powers in non-degenerate binary recurrence sequences, proved by Peth\H{o} and by Shorey and Stewart.

Keywords

Cite

@article{arxiv.2208.05145,
  title  = {Reverse Engineered Diophantine Equations over $\mathbb{Q}$},
  author = {Katerina Santicola},
  journal= {arXiv preprint arXiv:2208.05145},
  year   = {2024}
}
R2 v1 2026-06-25T01:36:55.331Z