Resumen de Integer-Coefficient Polynomials Have Prime-Rich Images
Bryan Bischof, Javier Gómez-Calderón, Andrew Perriello
It is well known that a nonconstant polynomial f (x) with integer coefficients produces, for integer values of x, at least one composite image. In this note, we use Taylor expansions to improve this elementary result, showing that f (x) takes an infinite number of composite values. Given a positive integer n, we show that f (x) takes an infinite number of values that are divisible by at least n distinct primes, and an infinite number of values that are divisible by pn for some prime p.
