Divisibility and Sequence Properties of σ+ and +
Abstract
Inspired by Lehmer's and Deaconescu's conjectures, as well as various analogue problems concerning Euler's totient function (n), Schemmel's totient function S2(n), Jordan totient function Jk, and the unitary totient function *(n), we investigate analogous divisibility problems involving the functions σ(n), σ+(n), and +(n). Further, we establish some interesting properties of the sequences \σ+(n)\n=1∞ and \+(n)\n=1∞, in particular, we prove that each of these sequences contains infinitely many arithmetic progressions of length 3.
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