A construction of integer-valued polynomials with prescribed sets of lengths of factorizations
Abstract
For an arbitrary finite set S of natural numbers greater 1, we construct an integer-valued polynomial f, whose set of lengths in Int(Z) is S. The set of lengths of f is the set of all natural numbers n, such that f has a factorization as a product of n irreducibles in Int(Z)=g in Q[x] | g(Z) contained in Z.
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