Difference between revisions of "Carmichael function"
m |
Enderramsby (talk | contribs) m (→See also) |
||
Line 37: | Line 37: | ||
* [[Modular arithmetic]] | * [[Modular arithmetic]] | ||
* [[Euler's totient theorem]] | * [[Euler's totient theorem]] | ||
+ | * [[Carmichael numbers]] | ||
[[Category:Functions]] | [[Category:Functions]] | ||
[[Category:Number theory]] | [[Category:Number theory]] |
Revision as of 10:54, 1 August 2022
There are two different functions called the Carmichael function. Both are similar to Euler's totient function .
First Definition
The Carmichael function is defined at to be the smallest positive integer such that for all positive integers relatively prime to . The order of always divides .
This function is also known as the reduced totient function or the least universal exponent function.
Suppose . We have
Examples
This article is a stub. Help us out by expanding it.
Evaluate . [1]
Second Definition
The second definition of the Carmichael function is the least common multiples of all the factors of . It is written as . However, in the case , we take as a factor instead of .
Examples
This article is a stub. Help us out by expanding it.