Carmichael number
Template:Pseudoprimality property
Definition
A composite number is termed an Carmichael number or absolute pseudoprime if it satisfies the following condition:
- The universal exponent (also called the Carmichael function) of divides .
- For any natural number relatively prime to , divides .
- is a Fermat pseudoprime to any base relatively prime to it.
Occurrence
Initial examples
561, 1105, 1729, 2465, 2821, 6601, [SHOW MORE]
Note that Carmichael number is square-free and Carmichael number is odd, so each of these is the product of distinct odd primes. For the first few examples, we indicate the prime factors:
| Carmichael number | Prime factors as list | 3? | 5? | 7? | 11? | 13? | 17? | 19? | 23? | 29? | Universal exponent (must divide number minus one) |
|---|---|---|---|---|---|---|---|---|---|---|---|
| 561 | 3, 11, 17 | Yes | No | No | Yes | No | Yes | No | No | No | 80 |
| 1105 | 5, 13, 17 | No | Yes | No | No | Yes | Yes | No | No | No | 48 |
| 1729 | 7, 13, 19 | No | No | Yes | No | Yes | No | Yes | No | No | 36 |
| 2465 | 5, 17, 29 | No | Yes | No | No | Yes | No | No | No | Yes | 112 |