Julia sets and geometrically finite maps over finite extensions of the p-adic field
Abstract
Let K be a finite extension of the field Qp of p-adic numbers, and φ∈ K(z) be a rational map of degree at least 2. We prove that the K-Julia set of φ is the natural restriction of Cp-Julia set, provided that the critical orbits are well-behaved. Moreover, under further assumption that φ is geometrically finite, we prove that the dynamics on the K-Julia set of φ is a countable state Markov shift.
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