Polynomial functions on rings of dual numbers over residue class rings of the integers
Abstract
The ring of dual numbers over a ring R is R[α] = R[x]/(x2), where α denotes x+(x2). For any finite commutative ring R, we characterize null polynomials and permutation polynomials on R[α] in terms of the functions induced by their coordinate polynomials (f1,f2∈ R[x], where f=f1+α f2) and their formal derivatives on R. We derive explicit formulas for the number of polynomial functions and the number of polynomial permutations on Zpn[α] for n p (p prime).
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