Locally nilpotent polynomials over Z
Abstract
For a polynomial u=u(x) in Z[x] and r∈Z, we consider the orbit of u at r denoted and defined by Ou(r):=\u(r),u(u(r)),…\. We ask two questions here: (i) what are the polynomials u for which 0∈ Ou(r), and (ii) what are the polynomials for which 0∈ Ou(r) but, modulo every prime p, 0∈ Ou(r)? In this paper, we give a complete classification of the polynomials for which (ii) holds for a given r. We also present some results for some special values of r where (i) can be answered.
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