An average version of Cilleruelo's conjecture for families of Sn-polynomials over a number field

Abstract

For f∈Z[X] an irreducible polynomial of degree n , the Cilleruelo's conjecture states that(lcm(f(1),…,f(M)))(n-1)M Mas M→+∞ , where lcm(f(1),…,f(M)) is the least common multiple of f(1),…,f(M). It's well-known for n=1 as a consequence of Dirichlet's Theorem for primes in arithmetic progression, and it was proved by Cilleruelo for quadratic polynomials. Recently the conjecture was shown by Rudnick and Zehavi for a large family of polynomials of any degree. We want to investigate an average version of the conjecture for Sn-polynomials with integral coefficients over a fixed extension K/Q by considering the least common multiple of ideals of OK.