Preperiodic points with local rationality conditions in the quadratic unicritical family

Abstract

For rational numbers c, we present a trichotomy of the set of totally real (totally p-adic, respectively) preperiodic points for maps in the quadratic unicritical family fc(x)=x2+c. As a consequence, we classify quadratic polynomials fc with rational parameters c∈Q so that fc has only finitely many totally real (totally p-adic, respectively) preperiodic points. These results rely on an adelic Fekete-type theorem and dynamics of the filled Julia set of fc. Moreover, using a numerical criterion introduced in [NP], we make explicit calculations of the set of totally real fc-preperiodic points when c=-1,0,15 and 14.

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