Moduli spaces of quadratic maps: arithmetic and geometry

Abstract

We establish an implication between two long-standing open problems in complex dynamics. The roots of the n-th Gleason polynomial Gn∈Q[c] comprise the 0-dimensional moduli space of quadratic polynomials with an n-periodic critical point. Pern(0) is the 1-dimensional moduli space of quadratic rational maps on P1 with an n-periodic critical point. We show that if Gn is irreducible over Q, then Pern(0) is irreducible over C. To do this, we exhibit a Q-rational smooth point on a projective completion of Pern(0), using the admissible covers completion of a Hurwitz space. In contrast, the Uniform Boundedness Conjecture in arithmetic dynamics would imply that for sufficiently large n, Pern(0) itself has no Q-rational points.

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