Stretching Newton polygons using pure polynomials
Number Theory
2025-01-29 v2
Abstract
The -adic Newton polygon is a visual tool that encodes information about the roots and factorization of a polynomial relative to a prime . In this article, we investigate how the Newton polygon changes under polynomial composition. If and are polynomials with rational (or -adic) coefficients and the Newton polygon of is pure (has only one segment), we show under some mild conditions that the Newton polygon of is the same as that of , but stretched horizontally by . When , this implies that all iterates of certain pure polynomials are irreducible, recovering a classical result of Robert Odoni on the irreducibility of iterated Eisenstein polynomials.
Cite
@article{arxiv.2405.10926,
title = {Stretching Newton polygons using pure polynomials},
author = {Rylan Gajek-Leonard and Uri Tomer},
journal= {arXiv preprint arXiv:2405.10926},
year = {2025}
}
Comments
8 pages