On Generalized Carmichael Numbers

Abstract

Given an integer k, define Ck as the set of integers n > (k,0) such that an-k+1 a n holds for all integers a. We establish various multiplicative properties of the elements in Ck and give a sufficient condition for the infinitude of Ck. Moreover, we prove that there are finitely many elements in Ck with one and two prime factors if and only if k>0 and k is prime. In addition, if all but two prime factors of n ∈ Ck are fixed, then there are finitely many elements in Ck, excluding certain infinite families of n. We also give conjectures about the growth rate of Ck with numerical evidence. We explore a similar question when both a and k are fixed and prove that for fixed integers a ≥ 2 and k, there are infinitely many integers n such that an-k 1 n if and only if (k,a) ≠ (0,2) by building off the work of Kiss and Phong. Finally, we discuss the multiplicative properties of positive integers n such that Carmichael function λ(n) divides n-k.