Value sets of non-permutation polynomials over the residue class rings of integers

Abstract

In this paper, we study the value sets of non-permutation polynomial functions over the residue class ring Z/mZ. When m=pr is a power of some prime p, an upper bound is given for the size of the value set of a polynomial function which is not a permutation. We also show that this upper bound can be achieved by some integral polynomials. Finally, we generalize the results for any positive integer m with known prime decomposition.

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