Minimally Intersective Polynomials with Arbitrarily Many Quadratic Factors

Abstract

Given a natural number n ≥ 4 we show that there exists infinitely many polynomials fn(x):= Πi=1n (x2 - ai) such that (i) fn(x) has a root modulo every positive integer, (ii) fn(x) has no rational roots, and (iii) every proper divisor of fn(x) fails to have root modulo some positive integer. We exhibit a process to explicitly construct such fn and this process demonstrates that the set of natural numbers an, such that the polynomial fn(x):= Πi=1n (x2 - ai) satisfies the properties (i), (ii) and (iii), is of positive asymptotic density in N.