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Square patterns in dynamical orbits

Number Theory 2024-03-29 v1 Dynamical Systems

Abstract

Let qq be an odd prime power. Let fFq[x]f\in \mathbb{F}_q[x] be a polynomial having degree at least 22, aFqa\in \mathbb{F}_q, and denote by fnf^n the nn-th iteration of ff. Let χ\chi be the quadratic character of Fq\mathbb{F}_q, and Of(a)\mathcal{O}_f(a) the forward orbit of aa under iteration by ff. Suppose that the sequence (χ(fn(a)))n1(\chi(f^n(a)))_{n\geq 1} is periodic, and mm is its period. Assuming a mild and generic condition on ff, we show that, up to a constant, mm can be bounded from below by Of(a)/q2log2(d)+12log2(d)+2|\mathcal{O}_f(a)|/q^\frac{2\log_{2}(d)+1}{2\log_2(d)+2}. 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 q2log2(d)+12log2(d)+2q^\frac{2\log_2(d)+1}{2\log_2(d)+2} consecutive squares or non-squares in the forward orbit of aa. In addition, we provide a classification of all polynomials for which our generic condition does not hold.

Keywords

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

R2 v1 2026-06-28T15:37:28.242Z