Arithmetic exceptionality of Latt\`es maps

Abstract

Let Fq denote a finite field of order q. A rational function r(x)∈ Q(x) is said to be arithmetically exceptional if it induces a permutation on P1(Fp) for infinitely many primes p. Based on some computational results, Odabas conjectured that for each k∈ N, the k-th Latt\`es map attached to an elliptic curve E/Q is arithmetically exceptional if and only if E has no k-torsion point whose x-coordinate is rational. In this paper, we prove that this conjecture is true for any elliptic curve E/Q having complex multiplication by an imaginary quadratic field other than Q(-11). On the other hand, we show that the conjecture becomes invalid if E has CM by Q(-11) and 6 k. Partial results for non-CM elliptic curves are also given.

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