Infinitude of k-Lehmer numbers which are not Carmichael
Abstract
In this paper, we prove that there are infinitely many n for which rad((n))|n-1 but n is not a Carmichael number. Additionally, we prove that for any k≥ 3, there exist infinitely many n such that (n)|(n-1)k but (n) (n-1)k-1. The constructs that we consider here are generalizations of Carmichael and Lehmer numbers, respectively, that were first formulated by Grau and Oller-Marc\'en.
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