Difference between revisions of "Mobius function"

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The Mobius function is a multiplicative number theoretic function defined as follows:
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The Mobius function is a multiplicative number theoretic function defined as follows:  
<math><cmath>\mu(n) = begin{cases} 0 & d^2 | n, \\ (-1)^k & n = p_1p_2\cdots{p_k} .\end{cases}</cmath></math>
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<cmath>\mu(n) = \begin{cases} 0 & d^2 | n, \\ (-1)^k & n = p_1p_2\cdots{p_k} .\end{cases}</cmath>
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In addition, <math>\mu(1) = 1</math>.

Revision as of 18:20, 26 January 2011

The Mobius function is a multiplicative number theoretic function defined as follows: \[\mu(n) = \begin{cases} 0 & d^2 | n, \\ (-1)^k & n = p_1p_2\cdots{p_k} .\end{cases}\] In addition, $\mu(1) = 1$.