Hobbit: Difference between revisions
Wikispaces>genewardsmith **Imported revision 281416552 - Original comment: Reverted to Jul 25, 2011 1:19 pm: vandalism** |
Wikispaces>genewardsmith **Imported revision 515120622 - Original comment: ** |
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<h2>IMPORTED REVISION FROM WIKISPACES</h2> | <h2>IMPORTED REVISION FROM WIKISPACES</h2> | ||
This is an imported revision from Wikispaces. The revision metadata is included below for reference:<br> | This is an imported revision from Wikispaces. The revision metadata is included below for reference:<br> | ||
: This revision was by author [[User:genewardsmith|genewardsmith]] and made on <tt> | : This revision was by author [[User:genewardsmith|genewardsmith]] and made on <tt>2014-06-27 14:09:48 UTC</tt>.<br> | ||
: The original revision id was <tt> | : The original revision id was <tt>515120622</tt>.<br> | ||
: The revision comment was: <tt> | : The revision comment was: <tt></tt><br> | ||
The revision contents are below, presented both in the original Wikispaces Wikitext format, and in HTML exactly as Wikispaces rendered it.<br> | The revision contents are below, presented both in the original Wikispaces Wikitext format, and in HTML exactly as Wikispaces rendered it.<br> | ||
<h4>Original Wikitext content:</h4> | <h4>Original Wikitext content:</h4> | ||
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Denoting the OETES for any element x of interval space by T(x), we first define the hobbit of an odd-numbered scale; that is, a scale for which v[1] is an odd number. If v[1] is odd then for each integer j, 0 < j __<__ v[1], we choose a corresponding monzo m such that <v|m> = j, 0 < <J|m> __<__ 1 where J is the JI mapping <log2(2) log2(3) ... log2(p)|, and T(m) is minimal. | Denoting the OETES for any element x of interval space by T(x), we first define the hobbit of an odd-numbered scale; that is, a scale for which v[1] is an odd number. If v[1] is odd then for each integer j, 0 < j __<__ v[1], we choose a corresponding monzo m such that <v|m> = j, 0 < <J|m> __<__ 1 where J is the JI mapping <log2(2) log2(3) ... log2(p)|, and T(m) is minimal. | ||
If v[1] is even, one approach is to proceed as before, but to break the tie at the midpoint of the scale by choosing the interval of least [[Benedetti height]]. Another approach adopted here is to choose a monzo u such that T(u) is minimal under the condition that T(u) > 0; in other words, u is a shortest positive length interval. Then for each integer j, where 0 < j __<__ to v[1], we choose a corresponding monzo m such that <v|m> = j, 0 < <J|m> __<__ 1, and where T(2m - u) is minimal. It should be noted that while this gives a canonical choice, the inverse hobbit is | If v[1] is even, one approach is to proceed as before, but to break the tie at the midpoint of the scale by choosing the interval of least [[Benedetti height]]. Another approach adopted here is to choose a monzo u such that T(u) is minimal under the condition that T(u) > 0; in other words, u is a shortest positive length interval. Then for each integer j, where 0 < j __<__ to v[1], we choose a corresponding monzo m such that <v|m> = j, 0 < <J|m> __<__ 1, and where T(2m - u) is minimal. It should be noted that while this gives a canonical choice, the inverse hobbit is fully equal as a scale to the canonical hobbit. | ||
The intervals selected by this process are a [[transversal]] of the scale, and we may now apply the chosen tuning to the monzos in the transversal, obtaining values (in cents or fractional monzos) defining a scale. The monzos in the transversal are defined only modulo the commas of the temperament, but since these are tempered out this does not affect the definition of the scale. | The intervals selected by this process are a [[transversal]] of the scale, and we may now apply the chosen tuning to the monzos in the transversal, obtaining values (in cents or fractional monzos) defining a scale. The monzos in the transversal are defined only modulo the commas of the temperament, but since these are tempered out this does not affect the definition of the scale. | ||
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Denoting the OETES for any element x of interval space by T(x), we first define the hobbit of an odd-numbered scale; that is, a scale for which v[1] is an odd number. If v[1] is odd then for each integer j, 0 &lt; j <u>&lt;</u> v[1], we choose a corresponding monzo m such that &lt;v|m&gt; = j, 0 &lt; &lt;J|m&gt; <u>&lt;</u> 1 where J is the JI mapping &lt;log2(2) log2(3) ... log2(p)|, and T(m) is minimal.<br /> | Denoting the OETES for any element x of interval space by T(x), we first define the hobbit of an odd-numbered scale; that is, a scale for which v[1] is an odd number. If v[1] is odd then for each integer j, 0 &lt; j <u>&lt;</u> v[1], we choose a corresponding monzo m such that &lt;v|m&gt; = j, 0 &lt; &lt;J|m&gt; <u>&lt;</u> 1 where J is the JI mapping &lt;log2(2) log2(3) ... log2(p)|, and T(m) is minimal.<br /> | ||
<br /> | <br /> | ||
If v[1] is even, one approach is to proceed as before, but to break the tie at the midpoint of the scale by choosing the interval of least <a class="wiki_link" href="/Benedetti%20height">Benedetti height</a>. Another approach adopted here is to choose a monzo u such that T(u) is minimal under the condition that T(u) &gt; 0; in other words, u is a shortest positive length interval. Then for each integer j, where 0 &lt; j <u>&lt;</u> to v[1], we choose a corresponding monzo m such that &lt;v|m&gt; = j, 0 &lt; &lt;J|m&gt; <u>&lt;</u> 1, and where T(2m - u) is minimal. It should be noted that while this gives a canonical choice, the inverse hobbit is | If v[1] is even, one approach is to proceed as before, but to break the tie at the midpoint of the scale by choosing the interval of least <a class="wiki_link" href="/Benedetti%20height">Benedetti height</a>. Another approach adopted here is to choose a monzo u such that T(u) is minimal under the condition that T(u) &gt; 0; in other words, u is a shortest positive length interval. Then for each integer j, where 0 &lt; j <u>&lt;</u> to v[1], we choose a corresponding monzo m such that &lt;v|m&gt; = j, 0 &lt; &lt;J|m&gt; <u>&lt;</u> 1, and where T(2m - u) is minimal. It should be noted that while this gives a canonical choice, the inverse hobbit is fully equal as a scale to the canonical hobbit.<br /> | ||
<br /> | <br /> | ||
The intervals selected by this process are a <a class="wiki_link" href="/transversal">transversal</a> of the scale, and we may now apply the chosen tuning to the monzos in the transversal, obtaining values (in cents or fractional monzos) defining a scale. The monzos in the transversal are defined only modulo the commas of the temperament, but since these are tempered out this does not affect the definition of the scale.<br /> | The intervals selected by this process are a <a class="wiki_link" href="/transversal">transversal</a> of the scale, and we may now apply the chosen tuning to the monzos in the transversal, obtaining values (in cents or fractional monzos) defining a scale. The monzos in the transversal are defined only modulo the commas of the temperament, but since these are tempered out this does not affect the definition of the scale.<br /> | ||