Carmichael numbers and least common multiples of p-1
Abstract
For a Carmichael number n with prime factors p1,·s,pm, define K=GCD[p1-1,·s,pm-1], and let C(X) denote the number of Carmichael numbers up to X such that K=. Assuming a strong conjecture on the first prime in an arithmetic progression, we prove that for any even natural number , C(X)≥ X1-(2+o(1)) X X. This is a departure from standard constructions of Carmichael numbers, which generally require K to grow along with n.
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