Don Page comma
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[[image:mathhazard.jpg align="left"]] By a //Don Page comma// is meant a comma computed from two other intervals by the method suggested by the Don Page paper, [[http://arxiv.org/abs/0907.5249|Why the Kirnberger Kernel Is So Small]]. If a and b are two rational numbers > 1, define r = ((a-1)(b+1)) / ((b-1)(a+1)). Suppose r reduced to lowest terms is p/q, and a and b are written in [[Monzos|monzo]] form as u and v. Then the Don Page comma is defined as DPC(a, b) = qu - pv, or else minus that if the size in cents is less than zero. The reason for introducing monzos is purely numerical; if monzos are not used the numerators and denominators of the Don Page comma quickly become so large they cannot easily be handled. In ratio form, the Don Page comma can be written a^q / b^p, or the reciprocal of that if that is less than 1. =Bimodular approximants= If x is near to 1, then ln(x)/2 is approximated by bim(x) = (x-1)/(x+1), the bimodular approximant function, which is the [[https://en.wikipedia.org/wiki/Pade_approximant|Padé approximant]] of order (1, 1) to ln(x)/2 near 1. The bimodular approximant function is a [[https://en.wikipedia.org/wiki/M%C3%B6bius_transformation|Möbius transformation]] and hence has an inverse, which we denote mib(x) = (1+x)/(1-x), which is the (1, 1) Padé approximant around 0 for exp(2x). Then bim(exp(2x)) = tanh(x), and therefore ln(mib(x))/2 = artanh(x) = x + x^3/x + x^5/5 + ..., from which it is apparent that bim(x) approximates ln(x)/2, and mib(x) approximates exp(2x), to the second order; we may draw the same conclusion by directly comparing the series for exp(2x) = 1 + 2x + 2x^2 + O(x^3) with mib(x) = 1 + 2x + 2x^2 + O(x^3) and ln(x)/2 = (x-1)/2 - (x-1)^2/4 + O(x^3), which is the same to the second order as bim(x). Using mib, we may also define BMC(a, b) = DPC(mib(a), mib(b)), where BMC is an acronym for "bimondular comma". If r is as above we have that r = bim(a)/bim(b), and depending on common factors the corresponding Don Page comma is equal to an nth power of a^bim(b) / b^bim(a) = mib(u)^v/mib(v)^u for some n. If we set a = 1+x, b = 1+y, then r = r(x, y) is an analytic function of two complex variables with a power series expansion around x=0, y=0. This expansion begins as r(x, y) = 1 - (xy^3 - x^3y)/24 + (3xy^4 + x^2y^3 - x^3y^2 - 3x^4y)/48 + ..., with its first nonconstant term of total degree four, and so when x and y are small, r(x, y) will be close to 1. The nth power will still be close to 1, and if there are common factors in the denominators of the exponents, the resulting comma will be less complex (lower in height), and this is the really interesting case. For example, if a = 7/6 and b = 27/25, we obtain (7/6)^(1/26) / (27/25)^(1/13), the lcm of 13 and 26 is 26, and taking the 26th power gives us 4375/4374. The common factor of 13 leads to the resulting comma (4375/4374) being relatively simple. It should be noted that a more general procedure for finding a comma from two intervals a and b is to use the convergents of the ratio of the logarithms; the Don Page construction might be regarded as a way pointing to examples where this is especially interesting. We might also note that successive superparticular ratios such as 10/9 and 11/10 or 12/11 and 13/12 exhibit a distinct tendency to produce strong (in the sense of low badness figures for the corresponding temperament) Don Page commas, not surprising when we note that in this case the first non-constant term of the one-variable expansion is of order five, but these are by no means the only examples. Here are some 5-limit Don Page commas: DPC(5/3, 3) = 27/25 DPC(4/3, 5/2) = 135/128 DPC(5/3, 2) = 648/625 DPC(4/3, 9/5) = 81/80 DPC(5/4, 2) = 128/125 DPC(4/3, 5/3) = 16875/16384, negri DPC(3/2, 5/3) = 20000/19683, tetracot DPC(10/9, 32/25) = |8 14 -13>, parakleisma DPC(5/4, 4/3) = |32 -7 -9>, escapade DPC(6/5, 5/4) = |-29 -11 20>, gammic DPC(10/9, 9/8) = |-70 72 -19> DPC(81/80, 25/24) = |71 -99 37>, raider DPC(81/80, 128/125) = |161 -84 -12>, the atom Here are some 7-limit Don Page commas: DPC(7/5, 2) = 50/49 DPC(6/5, 7/4) = 875/864 DPC(7/5, 5/3) = 3125/3087 DPC(9/7, 5/3) = 245/243 DPC(7/6, 8/5) = 1728/1715 DPC(8/7, 3/2) = 1029/1024 DPC(5/4, 7/5) = 3136/3125 DPC(9/8, 10/7) = 5120/5103 DPC(27/25, 7/6) = 4375/4374 From 11-limit consonances: DPC(11/10, 4/3) = 4000/3993 DPC(10/9, 11/8) = 8019/8000 DPC(11/9, 3/2) = 243/242 DPC(5/4, 11/7) = 176/175 DPC(8/7, 11/9) = 41503/41472 From 15-limit consonances: DPC(15/14, 16/13) = 43904/43875 DPC(14/13, 5/4) = 10985/10976 DPC(11/10, 15/13) = 225000/224939 DPC(15/13, 4/3) = 676/675 DPC(13/11, 7/5) = 847/845 DPC(6/5, 13/9) = 325/324 Here are some complex Don Page commas derived from other commas: DPC(525/512, 245/243) = |-153 277 -18 -87> DPC(49/48, 50/49) = |-487 -97 -198 392> DPC(10/9, 11/10) = |40 -38 40 0 -21> DPC(11/10, 12/11) = |-67 -23 -21 0 44> DPC(77/75, 245/243) = |0 286 -99 -103 19> DPC(55/54, 56/55) = |-442 -327 220 -111 220> DPC(176/175, 540/539) = |-58 -249 -137 139 110>
Original HTML content:
<html><head><title>Don Page comma</title></head><body><br /> <!-- ws:start:WikiTextLocalImageRule:2:<img src="/file/view/mathhazard.jpg" alt="" title="" align="left" /> --><img src="/file/view/mathhazard.jpg" alt="mathhazard.jpg" title="mathhazard.jpg" align="left" /><!-- ws:end:WikiTextLocalImageRule:2 --><br /> By a <em>Don Page comma</em> is meant a comma computed from two other intervals by the method suggested by the Don Page paper, <a class="wiki_link_ext" href="http://arxiv.org/abs/0907.5249" rel="nofollow">Why the Kirnberger Kernel Is So Small</a>. If a and b are two rational numbers > 1, define r = ((a-1)(b+1)) / ((b-1)(a+1)). Suppose r reduced to lowest terms is p/q, and a and b are written in <a class="wiki_link" href="/Monzos">monzo</a> form as u and v. Then the Don Page comma is defined as DPC(a, b) = qu - pv, or else minus that if the size in cents is less than zero. The reason for introducing monzos is purely numerical; if monzos are not used the numerators and denominators of the Don Page comma quickly become so large they cannot easily be handled. In ratio form, the Don Page comma can be written a^q / b^p, or the reciprocal of that if that is less than 1.<br /> <br /> <!-- ws:start:WikiTextHeadingRule:0:<h1> --><h1 id="toc0"><a name="Bimodular approximants"></a><!-- ws:end:WikiTextHeadingRule:0 -->Bimodular approximants</h1> If x is near to 1, then ln(x)/2 is approximated by bim(x) = (x-1)/(x+1), the bimodular approximant function, which is the <a class="wiki_link_ext" href="https://en.wikipedia.org/wiki/Pade_approximant" rel="nofollow">Padé approximant</a> of order (1, 1) to ln(x)/2 near 1. The bimodular approximant function is a <a class="wiki_link_ext" href="https://en.wikipedia.org/wiki/M%C3%B6bius_transformation" rel="nofollow">Möbius transformation</a> and hence has an inverse, which we denote mib(x) = (1+x)/(1-x), which is the (1, 1) Padé approximant around 0 for exp(2x). Then bim(exp(2x)) = tanh(x), and therefore ln(mib(x))/2 = artanh(x) = x + x^3/x + x^5/5 + ..., from which it is apparent that bim(x) approximates ln(x)/2, and mib(x) approximates exp(2x), to the second order; we may draw the same conclusion by directly comparing the series for exp(2x) = 1 + 2x + 2x^2 + O(x^3) with mib(x) = 1 + 2x + 2x^2 + O(x^3) and ln(x)/2 = (x-1)/2 - (x-1)^2/4 + O(x^3), which is the same to the second order as bim(x). Using mib, we may also define BMC(a, b) = DPC(mib(a), mib(b)), where BMC is an acronym for "bimondular comma".<br /> <br /> If r is as above we have that r = bim(a)/bim(b), and depending on common factors the corresponding Don Page comma is equal to an nth power of a^bim(b) / b^bim(a) = mib(u)^v/mib(v)^u for some n. If we set a = 1+x, b = 1+y, then r = r(x, y) is an analytic function of two complex variables with a power series expansion around x=0, y=0. This expansion begins as r(x, y) = 1 - (xy^3 - x^3y)/24 + (3xy^4 + x^2y^3 - x^3y^2 - 3x^4y)/48 + ..., with its first nonconstant term of total degree four, and so when x and y are small, r(x, y) will be close to 1. The nth power will still be close to 1, and if there are common factors in the denominators of the exponents, the resulting comma will be less complex (lower in height), and this is the really interesting case. For example, if a = 7/6 and b = 27/25, we obtain (7/6)^(1/26) / (27/25)^(1/13), the lcm of 13 and 26 is 26, and taking the 26th power gives us 4375/4374. The common factor of 13 leads to the resulting comma (4375/4374) being relatively simple. <br /> <br /> It should be noted that a more general procedure for finding a comma from two intervals a and b is to use the convergents of the ratio of the logarithms; the Don Page construction might be regarded as a way pointing to examples where this is especially interesting. We might also note that successive superparticular ratios such as 10/9 and 11/10 or 12/11 and 13/12 exhibit a distinct tendency to produce strong (in the sense of low badness figures for the corresponding temperament) Don Page commas, not surprising when we note that in this case the first non-constant term of the one-variable expansion is of order five, but these are by no means the only examples.<br /> <br /> Here are some 5-limit Don Page commas:<br /> <br /> DPC(5/3, 3) = 27/25<br /> DPC(4/3, 5/2) = 135/128<br /> DPC(5/3, 2) = 648/625<br /> DPC(4/3, 9/5) = 81/80<br /> DPC(5/4, 2) = 128/125<br /> DPC(4/3, 5/3) = 16875/16384, negri<br /> DPC(3/2, 5/3) = 20000/19683, tetracot<br /> DPC(10/9, 32/25) = |8 14 -13>, parakleisma<br /> DPC(5/4, 4/3) = |32 -7 -9>, escapade<br /> DPC(6/5, 5/4) = |-29 -11 20>, gammic<br /> DPC(10/9, 9/8) = |-70 72 -19><br /> DPC(81/80, 25/24) = |71 -99 37>, raider<br /> DPC(81/80, 128/125) = |161 -84 -12>, the atom<br /> <br /> Here are some 7-limit Don Page commas:<br /> <br /> DPC(7/5, 2) = 50/49<br /> DPC(6/5, 7/4) = 875/864<br /> DPC(7/5, 5/3) = 3125/3087<br /> DPC(9/7, 5/3) = 245/243<br /> DPC(7/6, 8/5) = 1728/1715<br /> DPC(8/7, 3/2) = 1029/1024<br /> DPC(5/4, 7/5) = 3136/3125<br /> DPC(9/8, 10/7) = 5120/5103<br /> DPC(27/25, 7/6) = 4375/4374<br /> <br /> From 11-limit consonances:<br /> <br /> DPC(11/10, 4/3) = 4000/3993<br /> DPC(10/9, 11/8) = 8019/8000<br /> DPC(11/9, 3/2) = 243/242<br /> DPC(5/4, 11/7) = 176/175<br /> DPC(8/7, 11/9) = 41503/41472<br /> <br /> From 15-limit consonances:<br /> <br /> DPC(15/14, 16/13) = 43904/43875<br /> DPC(14/13, 5/4) = 10985/10976<br /> DPC(11/10, 15/13) = 225000/224939<br /> DPC(15/13, 4/3) = 676/675<br /> DPC(13/11, 7/5) = 847/845<br /> DPC(6/5, 13/9) = 325/324<br /> <br /> Here are some complex Don Page commas derived from other commas:<br /> <br /> DPC(525/512, 245/243) = |-153 277 -18 -87><br /> DPC(49/48, 50/49) = |-487 -97 -198 392><br /> DPC(10/9, 11/10) = |40 -38 40 0 -21><br /> DPC(11/10, 12/11) = |-67 -23 -21 0 44><br /> DPC(77/75, 245/243) = |0 286 -99 -103 19><br /> DPC(55/54, 56/55) = |-442 -327 220 -111 220><br /> DPC(176/175, 540/539) = |-58 -249 -137 139 110></body></html>