Nilpotent polynomials over Z

Abstract

For a polynomial u(x) in Z[x] and r∈Z, we consider the orbit of u at r denoted and defined by Ou(r):=\u(n)(r)~|~n∈N\. Here we study polynomials for which 0 is in the orbit, and we call such polynomials nilpotent at r of index m where m is the minimum element of the set \n∈ N~|~u(n)(r)=0\. We provide here a complete classification of these polynomials when |r| 4, with |r| 1 already covered in the author's previous paper, titled Locally nilpotent polynomials over Z. The central goal of this paper is to study the following questions: (i) relation between the integers r and m when the set of nilpotent polynomials at r of index m is non-empty, (ii) classification of the integer polynomials with nilpotency index |r| for large enough |r|, and (iii) bounded integer polynomial sequences \rn\n 0.