Progress towards a nonintegrality conjecture

Abstract

Given r ∈ N, define the function Sr: N → Q by Sr(n)= Σk=0n kk+r nk. In 2015, the second author conjectured that there are infinitely many r ∈ N such that Sr(n) is nonintegral for all n ≥ 1, and proved that Sr(n) is not an integer for r ∈ \2,3,4\ and for all n ≥ 1. In 2016, Florian Luca and the second author raised the stronger conjecture that for any r ≥ 1, Sr(n) is nonintegral for all n ≥ 1. They proved that Sr(n) is nonintegral for r ∈ \5,6\ and that Sr(n) is not an integer for any r ≥ 2 and 1 ≤ n ≤ r-1. In particular, for all r ≥ 2, Sr(n) is nonintegral for at least r-1 values of n. In 2018, the fourth author gave sufficient conditions for the nonintegrality of Sr(n) for all n ≥ 1, and derived an algorithm to sometimes determine such nonintegrality; along the way he proved that Sr(n) is nonintegral for r ∈ \7,8,9,10\ and for all n ≥ 1. By improving this algorithm we prove the conjecture for r 22. Our principal result is that Sr(n) is usually nonintegral in that the upper asymptotic density of the set of integers n with Sr(n) integral decays faster than any fixed power of r-1 as r grows.