Patrick Ingram
Published 2010-10-17, updated 2011-02-12Version 2
We show that the set of complex points in the moduli space of polynomials of degree d corresponding to post-critically finite polynomials is a set of algebraic points of bounded height. It follows that for any B, the set of conjugacy classes of post-critically finite polynomials of degree d with coefficients of algebraic degree at most B is a finite and effectively computable set. In the case d=3 and B=1 we perform this computation. The proof of the main result comes down to finding a relation between the "naive" height on the moduli space, and Silverman's critical height.
Comments: Version 2: several errors have been corrected, and some new material added. The inequalities in the main result have changed slightly
Moduli spaces for families of rational maps on P^1
Integrality properties in the Moduli Space of Elliptic Curves: Isogeny Case
The hyperbolic lattice point problem in conjugacy classes
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