Rational Preperiodic Points of Quadratic Rational Maps over Q with Nonabelian Automorphism Groups

Abstract

Let f:P11 be a quadratic rational map defined over the rational field Q with nonabelian automorphism group. We prove that no such map has a Q-rational periodic point with exact period N 4. We also give an explicit parametrization of such maps that have Q-rational periodic points of period 1, 2, and 3. In addition, we show that the number of Q-rational preperiodic points of such a map f cannot exceed 6. As a result, we completely classify all portraits of Q-rational preperiodic points for quadratic rational maps defined over Q with nonabelian automorphism showing that there are exactly 5 such portraits.