BPS

Bohlen-Pierce-Stearns (BPS) is a temperament in the 3.5.7 subgroup generated by a sharp ~9/7 (or equivalently a flat ~7/3), tempering out the sensamagic comma, 245/243 so that a stack of two generators represents 5/3 in addition to 81/49, which generates a MOS scale of 4L 5s against the tritave, known as the Bohlen-Pierce Lambda scale. The "canonical" tuning for the generator is 3\13edt, representing the equal-tempered Bohlen-Pierce scale, but a range of other tunings are valid, including 4\17edt, 7\30edt, and 10\43edt.

As the generator of the Bohlen-Pierce scale, and the simplest decently accurate temperament of the 3.5.7 subgroup, this temperament fulfills a niche similar to meantone of the 2.3.5 subgroup, allowing for the tetrad 3:5:7:9 to serve as the theory's primary consonant tetrad.

For technical data, see Sensamagic clan#BPS or No-twos subgroup temperaments#BPS (currently, extensions with 2 are stored on the former page and no-twos extensions are stored on the latter).

Extensions

Several extensions of this temperament are possible to incorporate additional harmonics.

In the 11-limit, 1331/1323 is the most convenient comma that can be tempered out, which produces Mintra temperament; this splits the 9/7 generator (plus a tritave) in three and therefore functions instead as a weak extension of BPS, and a strong add-5 extension of Mintaka, which produces 5L 2s and 5L 7s MOS scales (functioning as a macro-superpyth). Simple tunings include 17edt and 39edt.

Another weak extension to add prime 17, known as Rigil, splits the 9/7 BPS generator in half, by tempering out 2025/2023 and equating two of 17/15 to 9/7. This produces 8L 1s enneatonic and 9L 8s chromatic MOS scales. Simple tunings include 17edt and 26edt.

While strong 11-limit extensions can be proposed, tempering out 77/75 in the flat range and 1375/1323 in the sharp range, neither of these are of particular accuracy; more accurate extensions would be of considerably higher complexity.

Sharp tunings generally possess a more convenient 13th harmonic than 11th, by tempering out 637/625 and identifying (25/21)² with 13/9, which is optimal near the 30edt tuning. It is then very easy to insert in 19 by tempering 247/245, and identifying 13/9 with 27/19, therefore placing the 19th harmonic 10 generators down; this extension is optimal near the 56edt tuning.

Interval chains

In the below, tritave-reduced harmonics below 243 are indicated in bold.