19-limit
In 19-limit Just Intonation, all ratios in the system will contain no primes higher than 19.
The 19-prime-limit can be modeled in a 7-dimensional lattice, with the primes 3, 5, 7, 11, 13, 17, and 19 represented by each dimension. The prime 2 does not appear in the typical 19-limit lattice because octave equivalence is presumed. If octave equivalence is not presumed, an eighth dimension is need.
19-odd limit Intervals of 19
| Ratio | Cents Value | Color name | Name | |
|---|---|---|---|---|
| 20/19 | 88.801 | 19uy1 | nuyo 1sn | lesser undevicesimal semitone |
| 19/18 | 93.603 | 19o2 | ino 2nd | greater undevicesimal semitone |
| 19/17 | 192.558 | 19o17u2 | nosu 2nd | undevicesimal whole tone ("meantone") |
| 22/19 | 253.805 | 19u1o2 | nulo 2nd | enneadecimal second–third |
| 19/16 | 297.513 | 19o3 | ino 3rd | undevicesimal minor third |
| 24/19 | 404.442 | 19u3 | inu 3rd | lesser undevicesimal major third |
| 19/15 | 409.244 | 19og4 | nogu 4th | greater undevicesimal major third |
| 19/14 | 528.687 | 19or4 | noru 4th | undevicesimal acute fourth |
| 26/19 | 543.015 | 19u3o5 | nutho 5th | undevicesimal superfourth |
| 19/13 | 656.985 | 19o3u4 | nothu 4th | undevicesimal subfifth |
| 28/19 | 671.313 | 19uz5 | nuzo 5th | undevicesimal grave fifth |
| 30/19 | 790.756 | 19uy5 | nuyo 5th | lesser undevicesimal minor sixth |
| 19/12 | 795.558 | 19o6 | ino 6th | lesser undevicesimal minor sixth |
| 32/19 | 902.487 | 19u6 | inu 6th | undevicesimal major sixth |
| 19/11 | 946.195 | 19o1u7 | nolu 7th | enneadecimal sixth–seventh |
| 34/19 | 1007.442 | 19u17o7 | nuso 7th | undevicesimal minor seventh |
| 36/19 | 1106.397 | 19u7 | inu 7th | lesser undevicesimal major seventh |
| 19/10 | 1111.199 | 19og8 | nogu 8ve | greater undevicesimal major seventh |
see Harmonic Limit