On the Common Prime Divisors of Polynomials

Abstract

The prime divisors of a polynomial P with integer coefficients are those primes p for which P(x) 0 p is solvable. Our main result is that the common prime divisors of any several polynomials are exactly the prime divisors of some single polynomial. By combining this result with a theorem of Ax we get that for any system F of multivariate polynomial equations with integer coefficients, the set of primes p for which F is solvable modulo p is the set of prime divisors of some univariate polynomial. In addition, we prove results on the densities of the prime divisors of polynomials. The article serves as a light introduction to algebraic number theory and Galois theory.