The Least Common Multiple of Polynomial Values over Function Fields

Abstract

Cilleruelo conjectured that for an irreducible polynomial f ∈ Z[X] of degree d ≥ 2 one has [lcm(f(1),f(2),… f(N))](d-1)N N as N ∞. He proved it in the case d=2 but it remains open for every polynomial with d>2. We investigate the function field analogue of the problem by considering polynomials over the ring Fq[T]. We state an analog of Cilleruelo's conjecture in this setting: denoting by Lf(n) := lcm (f(Q)\ : \ Q ∈ Fq[T] monic,\, deg\,Q = n) we conjecture that equationeq:conjffabsdeg\, Lf(n) cf (d-1) nqn,\ n ∞equation (cf is an explicit constant dependent only on f, typically cf=1). We give both upper and lower bounds for Lf(n) and show that the conjectured asymptotic holds for a class of ``special" polynomials, initially considered by Leumi in this context, which includes all quadratic polynomials and many other examples as well. We fully classify these special polynomials. We also show that deg\, Lf(n) deg\,rad(Lf(n)) (in other words the corresponding LCM is close to being squarefree), which is not known over Z.

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