On some notions of good reduction for endomorphisms of the projective line

Abstract

Let be an endomorphism of (), the projective line over the algebraic closure of , of degree ≥2 defined over a number field K. Let v be a non-archimedean valuation of K. We say that has critically good reduction at v if any pair of distinct ramification points of do not collide under reduction modulo v and the same holds for any pair of branch points. We say that has simple good reduction at v if the map v, the reduction of modulo v, has the same degree of . We prove that if has critically good reduction at v and the reduction map v is separable, then has simple good reduction at v.