Square patterns in dynamical orbits
Abstract
Let be an odd prime power. Let be a polynomial having degree at least , , and denote by the -th iteration of . Let be the quadratic character of , and the forward orbit of under iteration by . Suppose that the sequence is periodic, and is its period. Assuming a mild and generic condition on , we show that, up to a constant, can be bounded from below by . More informally, we prove that the period of the appearance of squares in an orbit of an element provides an upper bound for the size of the orbit itself. Using a similar method, we can also prove that, up to a constant, we cannot have more than consecutive squares or non-squares in the forward orbit of . In addition, we provide a classification of all polynomials for which our generic condition does not hold.
Cite
@article{arxiv.2403.19642,
title = {Square patterns in dynamical orbits},
author = {Vefa Goksel and Giacomo Micheli},
journal= {arXiv preprint arXiv:2403.19642},
year = {2024}
}
Comments
17 pages