Newly reducible polynomial iterates
Abstract
Given a field and , we say that a polynomial has newly reducible th iterate over if is irreducible over , but is not (here denotes the th iterate of ). We pose the problem of characterizing, for given , fields such that there exists of degree with newly reducible th iterate, and the similar problem for fields admitting infinitely many such . We give results in the cases as well as for when . In particular, we show that for all these pairs, there are infinitely many monic of degree with newly reducible th iterate over . Curiously, the minimal polynomial of the golden ratio is one example of with newly reducible third iterate; very few other examples have small coefficients. Our investigations prompt a number of conjectures and open questions.
Keywords
Cite
@article{arxiv.2008.01222,
title = {Newly reducible polynomial iterates},
author = {Peter Illig and Rafe Jones and Eli Orvis and Yukihiko Segawa and Nick Spinale},
journal= {arXiv preprint arXiv:2008.01222},
year = {2021}
}
Comments
18 pages