Height coincidences in products of the projective line

Abstract

We consider hypersurfaces in (P1)n that contain a generic sequence of small dynamical height with respect to a split map and project onto n-1 coordinates. We show that these hypersurfaces satisfy strong coincidence relations between their points with zero height coordinates. More precisely, it holds that in a Zariski-open dense subset of such a hypersurface n-1 coordinates have height zero if and only if all coordinates have height zero. This is a key step in the resolution of the dynamical Bogomolov conjecture for split maps.