Genuine and strongly genuine polynomials: With an application to the persistence of Galois groups under specialization

Abstract

We develop the theory of strongly n-genuine polynomials F(Y,X1,…,Xn), which have the property that the number of specializations F(Y,X1,x') with x'=(x2,…,xn) ∈ Zn-1 (respectively x' ∈ Fpn-1) such that F(Y,X1,x') is reducible over Q (respectively over Fp) can be well-controlled quantitatively. We also develop the theory of a larger class of n-genuine polynomials F(Y,X1,…,Xn), which have the property that the number of specializations F(Y,X1,x') with x' ∈ Zn-1 (respectively x' ∈ Fpn-1) such that F(Y,X1,x') splits completely over Q (respectively over Fp) into factors that are linear in Y can be well-controlled quantitatively. For each of these classes, we prove that there are four equivalent characterizations. As an application, we demonstrate that n-genuine and strongly n-genuine polynomials can be used to prove, for any polynomial F(Y,X1,…,Xn), an upper bound for the number of specializations F(Y,x) with x=(x1,…,xn) ∈ Zn such that the Galois group of the splitting field of F(Y,x) over Q is not isomorphic to the Galois group of the splitting field of F(Y,X1,…,Xn) over Q(X1,…,Xn). We simultaneously prove analogous results over any number field.

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