Table of zeta-stretched edos: Difference between revisions
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Corrected my maths mistakes, and chose a single zeta tuning for those edos where I previously listed two (I was originally indecisive over whether to prioritise peak height or closeness to the edo, but after looking at the Tenney and Weil tunings for the edos I decided to prioritise peak height because that lines up better) |
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This table lists tuning instructions for [[EDO|equal divisions of the octave]] which have been stretched or compressed using optimal octave stretch based on zeta peaks, as described here: [[the Riemann zeta function and tuning]]. | This table lists tuning instructions for [[EDO|equal divisions of the octave]] which have been stretched or compressed using optimal octave stretch based on zeta peaks, as described here: [[the Riemann zeta function and tuning]]. | ||
No such table could possibly be complete (as there are so many possible edos), so please add tunings of interest as you see fit. | |||
All of the tunings listed on this page are [[zeta peak index]] tunings, e.g. 1zpi, 2zpi, 3zpi... However, not all zeta peak index tunings are listed here - only those with intervals close to the octave. For a more complete table see: [[zeta peak index]]. | All of the tunings listed on this page are [[zeta peak index]] tunings, e.g. 1zpi, 2zpi, 3zpi... However, not all zeta peak index tunings are listed here - only those with intervals close to the octave. For a more complete table see: [[zeta peak index]]. | ||
Revision as of 09:25, 30 March 2024
This table lists tuning instructions for equal divisions of the octave which have been stretched or compressed using optimal octave stretch based on zeta peaks, as described here: the Riemann zeta function and tuning.
No such table could possibly be complete (as there are so many possible edos), so please add tunings of interest as you see fit.
All of the tunings listed on this page are zeta peak index tunings, e.g. 1zpi, 2zpi, 3zpi... However, not all zeta peak index tunings are listed here - only those with intervals close to the octave. For a more complete table see: zeta peak index.
Calculation instructions
How to calculate the third column using the free version of Wolfram Cloud:
- Copy-paste Plot[Abs[RiemannSiegelZ[9.06472028x]], {x, 11.9,12.1}] into a cell.
- Change "11.9" and "12.1" to whatever values you want, e.g. to view the curve around 15edo you might use the values "14.9" and "15.1".
- Ensure that cell is still selected
- In the menu select Evaluation > Evaluate Cells
Table
| Tuning | Associated edo | No. of steps per 1200 cents | Step size (cents) | Tuning of 2/1 (cents) | Gram point index |
|---|---|---|---|---|---|
| 1zpi | 1edo | 1.127 | 1065.177 | 1065.177 | -1 |
| 2zpi | 2edo | 1.973 | 608.283 | 1216.565 | 0 |
| 4zpi | 3edo | 3.060 | 392.187 | 1176.562 | 2 |
| 6zpi | 4edo | 3.904 | 307.342 | 1229.367 | 4 |
| 9zpi | 5edo | 5.034 | 238.357 | 1191.783 | 7 |
| 12zpi | 6edo | 6.035 | 198.843 | 1193.056 | 10 |
| 15zpi | 7edo | 6.957 | 172.496 | 1207.471 | 13 |
| 19zpi | 8edo | 8.137 | 147.467 | 1179.734 | 17 |
| 22zpi | 9edo | 8.950 | 134.078 | 1206.705 | 20 |
| 26zpi | 10edo | 10.008 | 119.899 | 1198.986 | 24 |
| 30zpi | 11edo | 11.037 | 108.722 | 1195.938 | 28 |
| 34zpi | 12edo | 12.023 | 99.807 | 1197.686 | 32 |
| 38zpi | 13edo | 12.969 | 92.531 | 1202.900 | 36 |
| 42zpi | 14edo | 13.900 | 86.329 | 1208.611 | 40 |
| 47zpi | 15edo | 15.053 | 79.716 | 1195.736 | 45 |
| 51zpi | 16edo | 15.944 | 75.262 | 1204.187 | 49 |
| 56zpi | 17edo | 17.045 | 70.404 | 1196.861 | 54 |
| 61zpi | 18edo | 18.119 | 66.228 | 1192.113 | 59 |
| 65zpi | 19edo | 18.948 | 63.331 | 1203.288 | 63 |
| 70zpi | 20edo | 19.982 | 60.054 | 1201.087 | 68 |
| 75zpi | 21edo | 21.028 | 57.067 | 1198.406 | 73 |
| 80zpi | 22edo | 22.025 | 54.483 | 1198.630 | 78 |
| 84zpi | 23edo | 22.807 | 52.615 | 1210.148 | 82 |
| 90zpi | 24edo | 24.006 | 49.988 | 1199.713 | 88 |
| 95zpi | 25edo | 24.965 | 48.067 | 1201.678 | 93 |
| 100zpi | 26edo | 25.936 | 46.268 | 1202.975 | 98 |
| 106zpi | 27edo | 27.087 | 44.302 | 1196.163 | 104 |
| 111zpi | 28edo | 28.032 | 42.808 | 1198.629 | 109 |
| 116zpi | 29edo | 28.940 | 41.465 | 1202.489 | 114 |
| 122zpi | 30edo | 30.061 | 39.918 | 1197.555 | 120 |
| 127zpi | 31edo | 30.978 | 38.737 | 1200.837 | 125 |
| 133zpi | 32edo | 32.070 | 37.418 | 1197.375 | 131 |
| 138zpi | 33edo | 32.972 | 36.394 | 1201.009 | 136 |
| 144zpi | 34edo | 34.045 | 35.248 | 1198.419 | 142 |
| 149zpi | 35edo | 34.925 | 34.359 | 1202.564 | 147 |
| 155zpi | 36edo | 35.982 | 33.350 | 1200.587 | 153 |
| 161zpi | 37edo | 37.028 | 32.408 | 1199.108 | 159 |
| 166zpi | 38edo | 37.890 | 31.671 | 1203.480 | 164 |
| 173zpi | 39edo | 39.124 | 30.672 | 1196.204 | 171 |
| 178zpi | 40edo | 39.968 | 30.024 | 1200.965 | 176 |
| 184zpi | 41edo | 40.988 | 29.277 | 1200.349 | 182 |
| 190zpi | 42edo | 41.999 | 28.572 | 1200.032 | 188 |
| 196zpi | 43edo | 43.026 | 27.890 | 1199.261 | 194 |
| 202zpi | 44edo | 44.015 | 27.263 | 1199.579 | 200 |
| 207zpi | 45edo | 44.840 | 26.762 | 1204.289 | 205 |
| 214zpi | 46edo | 46.009 | 26.082 | 1199.766 | 212 |
| 220zpi | 47edo | 47.006 | 25.529 | 1199.846 | 218 |
| 226zpi | 48edo | 47.988 | 25.006 | 1200.292 | 224 |
| 233zpi | 49edo | 49.141 | 24.419 | 1196.552 | 231 |
| 238zpi | 50edo | 49.939 | 24.030 | 1201.477 | 236 |
| 245zpi | 51edo | 51.080 | 23.493 | 1198.128 | 243 |
| 251zpi | 52edo | 52.043 | 23.058 | 1199.018 | 249 |
| 257zpi | 53edo | 52.997 | 22.643 | 1200.072 | 255 |
| 264zpi | 54edo | 54.116 | 22.175 | 1197.430 | 262 |
| 269zpi | 55edo | 54.894 | 21.860 | 1202.325 | 267 |
| 276zpi | 56edo | 56.008 | 21.425 | 1199.821 | 274 |
| 282zpi | 57edo | 56.968 | 21.064 | 1200.668 | 280 |
| 289zpi | 58edo | 58.067 | 20.666 | 1198.621 | 287 |
| 295zpi | 59edo | 58.992 | 20.342 | 1200.157 | 293 |
| 301zpi | 60edo | 59.920 | 20.027 | 1201.599 | 299 |
| 308zpi | 61edo | 61.003 | 19.671 | 1199.937 | 306 |
| 314zpi | 62edo | 61.938 | 19.374 | 1201.200 | 312 |
| 321zpi | 63edo | 63.019 | 19.042 | 1199.633 | 319 |
| 328zpi | 64edo | 64.099 | 18.721 | 1198.140 | 326 |
| 334zpi | 65edo | 65.016 | 18.457 | 1199.708 | 332 |
| 340zpi | 66edo | 65.916 | 18.205 | 1201.533 | 338 |
| 347zpi | 67edo | 66.998 | 17.911 | 1200.029 | 345 |
| 354zpi | 68edo | 68.049 | 17.634 | 1199.131 | 352 |
| 360zpi | 69edo | 68.960 | 17.401 | 1200.696 | 358 |
| 367zpi | 70edo | 70.004 | 17.142 | 1199.931 | 365 |
| 374zpi | 71edo | 71.059 | 16.887 | 1198.998 | 372 |
| 380zpi | 72edo | 71.951 | 16.678 | 1200.824 | 378 |
| 387zpi | 73edo | 72.983 | 16.442 | 1200.273 | 385 |
| 394zpi | 74edo | 74.052 | 16.205 | 1199.155 | 392 |
| 401zpi | 75edo | 75.091 | 15.981 | 1198.544 | 399 |
| 407zpi | 76edo | 75.968 | 15.796 | 1200.503 | 405 |
| 414zpi | 77edo | 76.992 | 15.586 | 1200.127 | 412 |
| 420zpi | 78edo | 77.851 | 15.414 | 1202.292 | 418 |
| 427zpi | 79edo | 78.892 | 15.211 | 1201.637 | 425 |
| 435zpi | 80edo | 80.073 | 14.986 | 1198.904 | 433 |
| 441zpi | 81edo | 80.948 | 14.824 | 1200.777 | 439 |
| 448zpi | 82edo | 81.954 | 14.642 | 1200.671 | 446 |
| 455zpi | 83edo | 82.967 | 14.464 | 1200.484 | 453 |
| 462zpi | 84edo | 83.997 | 14.286 | 1200.040 | 460 |
| 469zpi | 85edo | 84.991 | 14.119 | 1200.131 | 467 |
| 476zpi | 86edo | 86.019 | 13.950 | 1199.741 | 474 |
| 483zpi | 87edo | 87.014 | 13.791 | 1199.808 | 481 |
| 490zpi | 88edo | 88.027 | 13.632 | 1199.635 | 488 |
| 497zpi | 89edo | 89.023 | 13.480 | 1199.691 | 495 |
| 504zpi | 90edo | 90.006 | 13.332 | 1199.917 | 502 |
| 510zpi | 91edo | 90.852 | 13.208 | 1201.956 | 508 |
| 518zpi | 92edo | 91.993 | 13.044 | 1200.089 | 516 |
| 525zpi | 93edo | 93.002 | 12.903 | 1199.969 | 523 |
| 532zpi | 94edo | 93.984 | 12.768 | 1200.208 | 530 |
| 540zpi | 95edo | 95.117 | 12.616 | 1198.526 | 538 |
| 546zpi | 96edo | 95.954 | 12.506 | 1200.570 | 544 |
| 553zpi | 97edo | 96.925 | 12.381 | 1200.927 | 551 |
| 560zpi | 98edo | 97.923 | 12.254 | 1200.941 | 558 |
| 568zpi | 99edo | 99.047 | 12.115 | 1199.427 | 566 |
| 575zpi | 100edo | 99.869 | 12.016 | 1201.577 | 573 |
| 1936zpi | 270edo | 270.018 | 4.444 | 1199.920 | 1934 |
| 2293zpi | 311edo | 311.004 | 3.858 | 1199.985 | 2291 |
| 2568zpi | 342edo | 341.975 | 3.509 | 1200.088 | 2566 |
| 3971zpi | 494edo | 494.014 | 2.429 | 1199.966 | 3969 |
| 5818zpi | 684edo | 683.939 | 1.755 | 1200.107 | 5816 |