POTE tuning

**POTE tuning** is the short form of **Pure-Octaves [[Tenney-Euclidean tuning#Pure%20octaves%20TE%20tuning]]**, a good choice for a standard tuning enforcing a just 2/1 octave.

The POTE tuning for a [[map matrix]] such as M = [<1 0 2 -1|, <0 5 1 12|] (the [[map]] for 7-limit [[Magic family|magic]], which consists of a linearly independent list of [[val|vals]] defining magic) can be found as follows:

#1 Form a matrix V from M by multiplying by the diagonal matrix which is zero off the diagonal and 1/log2(p) on the diagonal; in other words the diagonal is [1 1/log2(3) 1/log2(5) 1/log2(7)]. Another way to say this is that each val is "weighted" by dividing through by the logarithms, so that V = [<1 0 2/log2(5) -1/log2(7)| <5/log2(3) 1/log2(5) 12/log2(7)]

#2 Find the matrix P = V*(VV*)^(-1), where V* is the transpose matrix.

#3 Find T = <1 1 1 1|P.

#4 Find POTE = T/T[1]; in other words T scalar divided by T[1], the first element of T.

If you carry out these operations, you should find

V ~ [<1 0 0.861 -0.356|, <0 3.155 0.431 4.274|]

T ~ <1.000902 0.317246|

POTE ~ <1 0.3169600|

The tuning of the POTE [[generator]] corresponding to the mapping M is therefore 0.31696 octaves, or 380.252 cents. Naturally, this only gives the single POTE generator in the rank two case, and only when the map M is in period-generator form, but the POTE tuning can still be found in this way for mappings defining higher rank temperaments. The method can be generalized to subgroup temperaments so long as the group contains 2 by [[Lp tuning|POL2 tuning]].

<html><head><title>POTE tuning</title></head><body><strong>POTE tuning</strong> is the short form of <strong>Pure-Octaves <a class="wiki_link" href="/Tenney-Euclidean%20tuning#Pure%20octaves%20TE%20tuning">Tenney-Euclidean tuning</a></strong>, a good choice for a standard tuning enforcing a just 2/1 octave.<br />
<br />
The POTE tuning for a <a class="wiki_link" href="/map%20matrix">map matrix</a> such as M = [&lt;1 0 2 -1|, &lt;0 5 1 12|] (the <a class="wiki_link" href="/map">map</a> for 7-limit <a class="wiki_link" href="/Magic%20family">magic</a>, which consists of a linearly independent list of <a class="wiki_link" href="/val">vals</a> defining magic) can be found as follows:<br />
<br />
#1 Form a matrix V from M by multiplying by the diagonal matrix which is zero off the diagonal and 1/log2(p) on the diagonal; in other words the diagonal is [1 1/log2(3) 1/log2(5) 1/log2(7)]. Another way to say this is that each val is &quot;weighted&quot; by dividing through by the logarithms, so that V = [&lt;1 0 2/log2(5) -1/log2(7)| &lt;5/log2(3) 1/log2(5) 12/log2(7)]<br />
<br />
#2 Find the matrix P = V*(VV*)^(-1), where V* is the transpose matrix.<br />
<br />
#3 Find T = &lt;1 1 1 1|P.<br />
<br />
#4 Find POTE = T/T[1]; in other words T scalar divided by T[1], the first element of T.<br />
<br />
If you carry out these operations, you should find<br />
<br />
V ~ [&lt;1 0 0.861 -0.356|, &lt;0 3.155 0.431 4.274|]<br />
<br />
T ~ &lt;1.000902 0.317246|<br />
<br />
POTE ~ &lt;1 0.3169600|<br />
<br />
The tuning of the POTE <a class="wiki_link" href="/generator">generator</a> corresponding to the mapping M is therefore 0.31696 octaves, or 380.252 cents. Naturally, this only gives the single POTE generator in the rank two case, and only when the map M is in period-generator form, but the POTE tuning can still be found in this way for mappings defining higher rank temperaments. The method can be generalized to subgroup temperaments so long as the group contains 2 by <a class="wiki_link" href="/Lp%20tuning">POL2 tuning</a>.</body></html>