Estimating the greatest common divisor of the value of two polynomials

Abstract

Let p be a fixed prime, and let v(a) stand for the exponent of p in the prime factorization of the integer a. Let f and g be two monic polynomials with integer coefficients and nonzero resultant r. Write S for the maximum of v( (f(n), g(n))) over all integers n. It is known that S v(r). We give various lower and upper bounds for the least possible value of v(r)-S provided that a given power ps divides both f(n) and g(n) for all n. In particular, the least possible value is ps2-s for s p and is asymptotically (p-1)s2 for large s.