Let K be a number field with ring of integers OK, and let f (x) Kx be a monic, irreducible polynomial. We establish necessary and sufficient conditions in terms of the critical points of f (x) for the iterates of f (x) to be monogenic polynomials. More generally, we give necessary and sufficient conditions for the backwards orbits of elements of OK under f (x) to be monogenerators. We apply our criteria to construct novel examples of dynamically monogenic polynomials, yielding infinite towers of monogenic number fields with the backward orbit of one monogenerator giving a monogenerator at the next level.
König et al. (Wed,) studied this question.
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