Let K be a number field and f: P¹ P¹ a rational map of degree d 2 with at most s places of bad reduction, where we include all archimedean places. We prove that there exists constants c₁, c₂ > 0, depending only on d and not on f or K, such that \# \ x P¹ (K) hf (x) c₁{s hₑ₀ₓ₃ (f) \} c₂ s (s). Here, ratd is the moduli space of rational maps up to conjugacy, hₑ₀ₓ₃ is an ample height and f is the equivalence class associated to f. This gives a uniform version of a theorem of Baker as well as generalizing the results of Benedetto and Looper from polynomials to rational maps. The main tool used is the degeneration of sequences of rational maps by Luo which has been recently formalized by Favre-Gong via Berkovich spaces.
Jit Wu Yap (Tue,) studied this question.
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