Carmichael Numbers in All Possible Arithmetic Progressions

Abstract

We prove that every arithmetic progression either contains infinitely many Carmichael numbers or none at all. Furthermore, there is a simple criterion for determining which category a given arithmetic progression falls into. In particular, if m is any integer such that (m,2φ(m))=1 then there exist infinitely many Carmichael numbers divisible by m. As a consequence, we are able to prove that n Carmichaelφ(n)n=0, resolving a question of Alford, Granville, and Pomerance.

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