On primary Carmichael numbers

Abstract

The primary Carmichael numbers were recently introduced as a special subset of the Carmichael numbers. A primary Carmichael number m has the unique property that sp(m) = p holds for each prime factor p, where sp(m) is the sum of the base-p digits of m. The first such number is Ramanujan's famous taxicab number 1729. Due to Chernick, all Carmichael numbers with three factors can be constructed by certain squarefree polynomials U3(t) ∈ Z[t], the simplest one being U3(t) = (6t+1)(12t+1)(18t+1). We show that the values of any U3(t) obey a special decomposition for all t ≥ 2 and besides certain exceptions also in the case t=1. These cases further imply that if all three factors of U3(t) are simultaneously odd primes, then U3(t) is not only a Carmichael number, but also a primary Carmichael number. Together with the exceptional cases, all Carmichael numbers with three factors have at least the property that sp(m) = p holds for the greatest prime factor p of m. Subsequently, we show some connections to taxicab and polygonal numbers, involving the number 1729 as an example again.