Ultrametric Root Counting

Abstract

Let K be a complete non-archimedean field with a discrete valuation, f∈ K[X] a polynomial with non-vanishing discriminant, A the valuation ring of K, and the maximal ideal of A. The first main result of this paper is a reformulation of Hensel's lemma that connects the number of roots of f with the number of roots of its reduction modulo a power of . We then define a condition --- regularity --- that yields a simple method to compute the exact number of roots of f in K. In particular, we show that regularity implies that the number of roots of f equals the sum of the numbers of roots of certain binomials derived from the Newton polygon.