Revision as of 00:11, 6 November 2021 edit Blacklemon67 (talk \| contribs) Extended confirmed users 898 edits →Properties of the Carmichael function: clarify notation for section ← Previous edit		Revision as of 15:03, 7 January 2022 edit undo Macrakis (talk \| contribs) Autopatrolled, Extended confirmed users, Pending changes reviewers, Rollbackers 54,689 edits reword for simplicity Next edit →
Line 1: {{Short description\|function of interest in number theory}} [[File:carmichaelLambda.svg\|thumb\|upright=2\|Carmichael {{mvar \| λ}} function: {{math \| ''λ''(''n'')}} for {{math \| 1 ≤ ''n'' ≤ 1000}} (compared to Euler {{mvar \| φ}} function)]] In [[number theory]], a branch of [[mathematics]], the '''Carmichael function''' ~~associates to every [[positive integer]]~~ {{~~mvar~~math \| ''λ''(''n'')}} of a [[positive integer]] {{~~math~~mvar \| ~~''λ''(''~~n~~'')~~}}~~, defined~~ asis the smallest positive integer {{mvar \| m}} such that :{{bigmath\|''a<sup>m</sup>'' ≡ 1 {{pad\|1em}} ([[modular arithmetic\|mod]] ''n'')}} for every integer {{mvar \| a}} between 1 and {{mvar \| n}} that is [[coprime]] to {{mvar \| n}}. In algebraic terms, {{math \| ''λ''(''n'')}} is the [[exponent of a group\|exponent]] of the [[multiplicative group of integers modulo n\|multiplicative group of integers modulo {{mvar \| n}}]].

Carmichael function: Difference between revisions