Apollonius circles and the number of irreducible factors of polynomials

Abstract

We provide upper bounds for the sum of the multiplicities of the non-constant irreducible factors that appear in the canonical decomposition of a polynomial f(X)∈Z[X], in case all the roots of f lie inside an Apollonius circle associated to two points on the real axis with integer abscissae a and b, with ratio of the distances to these points depending on the admissible divisors of f(a) and f(b). In particular, we obtain such upper bounds for the case where f(a) and f(b) have few prime factors, and f is an Enestr\"om-Kakeya polynomial, or a Littlewood polynomial, or has a large leading coefficient. Similar results are also obtained for multivariate polynomials over arbitrary fields, in a non-Archimedean setting.