The critical orbit structure of quadratic polynomials in Zp
Abstract
We study the forward orbit of the critical point for polynomials of the form fc=z2+c defined over Zp. Hubbard trees capture the dynamical behavior for such maps with finite critical orbit in C. We suggest a notion of Hubbard trees in the non-Archimedean setting, and describe the possible structures that arise for polynomials in Zp. As an example, we take a closer look at the dynamics of fc for c∈Z3.
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