Lambda function: Difference between revisions

Revision as of 15:08, 2 December 2008

In number theory, the Lambda function is a function on positive integers which gives the exponent of the multiplicative group modulo that integer.

The value of λ on a prime power is:

The value of λ on a general integer n with prime factorisation

n=\prod _{i}p_{i}^{a_{i}}\,

is then

\lambda (n)=\mathop {\mbox{lcm}} _{i}\{\lambda (p_{i}^{a_{i}})\}.\,

The value of λ(n) always divides the value of Euler's totient function φ(n): they are equal if and only if n has a primitive root.

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-In [[number theory]], the '''Lambda function''' is a function on [[positive integer]]s which gives the [[exponent (group theory)|exponent]] of the multiplicative group modulo that integer.
+In [[number theory]], the '''Lambda function''' is a function on [[positive integer]]s which gives the [[exponent (group theory)|exponent]] of the [[multiplicative group]] modulo that integer.
+The value of λ on a prime power is:
+* <math>\lambda(2) = 1;~  \lambda(4) = 2;~ \lambda(2^n) = 2^{n-2} \mbox{ for } n \ge 2; \,</math>
+* <math>\lambda(p^n) = p^{n-1}(p-1) \mbox{ for } n \ge 1 \,</math> if <math>p\,</math> is an odd prime.
+The value of λ on a general integer ''n'' with prime factorisation
+:<math>n = \prod_i p_i^{a_i} \,</math>
+is then
+:<math>\lambda(n) = \mathop{\mbox{lcm}}_i \{ \lambda(p_i^{a_i}) \} .\,</math>
+The value of λ(''n'') always divides the value of [[Euler's totient function]] φ(''n''): they are equal if and only if ''n'' has a [[primitive root]].