Variation of Canonical Height for Fatou points on P1

Abstract

Let f: P1 P1 be a map of degree >1 defined over a function field k = K(X), where K is a number field and X is a projective curve over K. For each point a ∈ P1(k) satisfying a dynamical stability condition, we prove that the Call-Silverman canonical height for specialization ft at point at, for t ∈ X(Q) outside a finite set, induces a Weil height on the curve X; i.e., we prove the existence of a Q-divisor D = Df,a on X so that the function t hft(at) - hD(t) is bounded on X(Q) for any choice of Weil height associated to D. We also prove a local version, that the local canonical heights t λft, v(at) differ from a Weil function for D by a continuous function on X(Cv), at each place v of the number field K. These results were known for polynomial maps f and all points a ∈ P1(k) without the stability hypothesis, and for maps f that are quotients of endomorphisms of elliptic curves E over k. Finally, we characterize our stability condition in terms of the geometry of the induced map f: X× P1 → X× P1 over K; and we prove the existence of relative N\'eron models for the pair (f,a), when a is a Fatou point at a place γ of k, where the local canonical height λf,γ(a) can be computed as an intersection number.