Isotriviality and the space of morphisms on projective varieties

Abstract

Let K=k(C) be the function field of a smooth projective curve C over an infinite field k, let X be a projective variety over k. We prove two results. First, we show with some conditions that a K-morphism φ: XK XK of degree at least two is isotrivial if and only if φ has potential good reduction at all places v of K. Second, let (X,φ), (Y,) be dynamical systems where X,Y are defined over k and g:XK YK a dominant K-morphism, such that g φ = g. We show under certain conditions that if φ is defined over k, then is defined over k.