Avoiding algebraic integers of bounded house in orbits of rational functions over cyclotomic closures
Abstract
Let k be a number field with cyclotomic closure kcyc, and let h ∈ kcyc(x). For A 1 a real number, we show that \[ \ α ∈ kcyc : h(α) ∈ Z has house at most A \ \] is finite for many h. We also show that for many such h the same result holds if h(α) is replaced by orbits h(h(·s h(α))). This generalizes a result proved by Ostafe that concerns avoiding roots of unity, which is the case A=1.
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