Polynomials with integer roots
Abstract
Let Fn be the set of unitary polynomials of degree n 2 that have their roots in Z*. We note Q(x) := xn+a1xn-1+…+an. We show that any two fixed consecutive coefficients (aj,aj+1) (j ∈ \1,…,n-1\) define finitely many polynomials of Fn.
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