An improved bound on the least common multiple of polynomial sequences

Abstract

Cilleruelo conjectured that if f∈Z[x] of degree d 2 is irreducible over the rationals, then lcm(f(1),…,f(N))(d-1)N N as N∞. He proved it for the case d = 2. Very recently, Maynard and Rudnick proved there exists cd > 0 with lcm(f(1),…,f(N)) cd N N, and showed one can take cd = d-1d2. We give an alternative proof of this result with the improved constant cd = 1. We additionally prove the bound radlcm(f(1),…,f(N))2dN N and make the stronger conjecture that radlcm(f(1),…,f(N)) (d-1)N N as N∞.