Uniform bounds on S-integral preperiodic points for chebyshev polynomials

Abstract

Let K be a number field with algebraic closure K, let S be a finite set of places of K containing the archimedean places, and let be Chebyshev polynomial. In this paper we prove uniformity results on the number of S-integral preperiodic points relative to a non-preperiodic point β, as β varies over number fields of bounded degree.

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