On the finiteness of Carmichael numbers with Fermat factors and $L=2^{\alpha}P^2$
Tsumura, Y.;
On the finiteness of Carmichael numbers with Fermat factors and $L=2^{\alpha}P^2$
Let $m$ be a Carmichael number and let $L$ be the least common multiple of $p-1$, where $p$ runs over the prime factors of $m$. We determine all the Carmichael numbers $m$ with a Fermat prime factor such that $L=2^{\alpha}P^2$, where $k\in \mathbb{N}$ and $P$ is an odd prime number. There are eleven such Carmichael numbers.
Comment: 42 pages
Carmichael numbers, Fermat's prime numbers, Mathematics - Number Theory, 11A51, Arithmetic functions; related numbers; inversion formulas, Factorization; primality
Carmichael numbers, Fermat's prime numbers, Mathematics - Number Theory, 11A51, Arithmetic functions; related numbers; inversion formulas, Factorization; primality