MyWikiBiz, Author Your Legacy — Thursday November 28, 2024
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161 bytes added
, 16:34, 8 February 2010
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− | Applying the same procedure to any positive integer <math>n\!</math> produces an expression called the ''doubly recursive factorization'' of <math>n.\!</math> It serves to call this the ''drift'' of <math>n\!</math> and to notate the corresponding mapping from positive integers to factorization expressions as <math>\operatorname{drift}(n).\!</math> | + | Applying the same procedure to any positive integer <math>n\!</math> produces an expression called the ''doubly recursive factorization'' (DRF) of <math>n.\!</math> This may be abbreviated as <math>\operatorname{drf}(n).\!</math> |
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| + | The form of a DRF expression can be mapped into either one of two classes of graph-theoretical structures, called ''riffs'' and ''rotes'', respectively. |
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| + | The ''riff'' of <math>123456789\!</math> is the following digraph: |
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| {| align=center cellpadding="6" | | {| align=center cellpadding="6" |
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− | <br> | + | The ''rote'' of <math>123456789\!</math> is the following graph: |
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| {| align=center cellpadding="6" | | {| align=center cellpadding="6" |