Canonical heights and preperiodic points for weighted homogeneous families of polynomials

Abstract

A family ft(z) of polynomials over a number field K will be called weighted homogeneous if and only if ft(z)=F(ze, t) for some binary homogeneous form F(X, Y) and some integer e≥ 2. For example, the family zd+t is weighted homogeneous. We prove a lower bound on the canonical height, of the form \[hft(z)≥ ε \hMd(ft), |NormRft|\,\] for values z∈ K which are not preperiodic for ft. Here ε depends only on the number of places at which ft has bad reduction. For suitably generic morphisms :P1 P1, we also prove an absolute bound of this form for t in the image of over K (assuming the abc Conjecture), as well as uniform bounds on the number of preperiodic points (unconditionally).