Garibaldi: Difference between revisions

'''Garibaldi''' is a [[7-limit]] (and higher) [[regular temperament|temperament]] of the [[schismatic family #Garibaldi|schismatic family]]. It is an [[extension]] of [[helmholtz (temperament)|helmholtz]] temperament beyond the 5-limit but with the same simple [[chain of fifths|chain-of-fifths]] structure (so that [[chain-of-fifths notation|standard notation]] may be used). The garibaldi temperament tempers together the Pythagorean, syntonic, and archytas commas into a jack-of-all-trades "generic comma", which can be used to reach intervals of 3, 5, and 7. As in helmholtz temperament, [[5/4]] is mapped to the diminished fourth (e.g. C–F♭; a comma-flat major third), and the new mapping specific to garibaldi is that [[7/4]] is mapped to the double-diminished octave (e.g. C–C𝄫; a comma-flat minor seventh). This makes garibaldi a [[marvel temperaments|marvel]] and [[hemifamity temperaments|hemifamity]] temperament. Tuning the fifth a fraction of a cent sharp gives the best tunings.  

Immediate 11-limit extensions include '''cassandra''' ({{nowrap| 41 & 53 }}), mapping 11/8 to +23 fifths, '''andromeda''' ({{nowrap| 29 & 41 }}), mapping 11/8 to −18 fifths, and '''helenus''' ({{nowrap| 53 & 65d }}), mapping 11/8 to −30 fifths. Garibaldi is most naturally a 2.3.5.7.19-[[subgroup]] temperament due to its immediate availability of [[19/16]] at the minor third (C–E♭). This is sometimes known as ''garibaldi nestoria.''  

! colspan="3" | 13-limit extensions

Garibaldi is very naturally considered as a [[detemperament]] of the [[12edo|12 equal temperament]] (12et), where the chromatic scale becomes a near-equal [[5L 7s]]. The diagram on the right shows a 53-tone detempered scale, with a generator range of -26 to +26. 53 is the largest number of tones for a mos where the 12 categories never overlap.

Each pitch category of 12et is further divided into four or five qualities, separated by a [[pythagorean comma]], which represents the syntonic~septimal comma. Combining this division with the minor and major diatonic qualities of 12et, garibaldi can give up to ''eight'' qualities for each diatonic category. Taking thirds as an example: 

In 12tet:  

 

* 7/6~19/16~6/5 (minor)

* 5/4~19/15~9/7 (major)

 

 

* ~[[7/6]] (subminor)

* '''~[[19/16]] (minor)'''

* ~[[6/5]] (superminor)

* ~[[11/9]] (artoneutral)

* ~[[27/22]] (tendoneutral)

* ~[[5/4]] (submajor)

* '''~[[19/15]] (major)'''

* ~[[9/7]] (supermajor)

 

Notice also the little interval between artoneutral and tendoneutral, ~[[243/242]]. This interval spans 41 generator steps. 41edo tempers it out so that it merges artoneutral and tendoneutral into a [[Sqrt(3/2)|hemififth]] whereas 53edo exaggerates it to the size of the generic comma. 94edo tunes it to one half the size of the general comma, which can be seen as a good compromise.

On another note, excluding 41edo, the two neutral intervals also have natural 13-limit interpretations in cassandra: 11/9~[[39/32]] and 27/22~[[16/13]], tempering out [[352/351]]. This also means the minor third is ~[[13/11]].

Like in [[schismic]], it is recommended to adopt an additional module of accidentals such as arrows to represent the comma step. Garibaldi further benefits from this as the arrow also stands in for the septimal comma, so that the same inflection can be used to reach classical and septimal intervals alike.

 

The following table shows how to notate 2.3.5.7.11.13.19 intervals in each extension of garibaldi.  

{| class="wikitable" style="text-align:center; vertical-align:middle;"

|+Nomenclature of selected intervals

|- style="font-weight:bold;"

|- style="font-weight:bold;"

| Cassandra

| Andromeda

| colspan="3" | C–G (perfect fifth)

| colspan="3" | C–↓E (downmajor third)

| colspan="3" | C–↓Bb (downminor seventh)

| C–↑↑F (dupfourth)

| C–↓↓F#* (dudtritone)

| C–↑↑Ab (dupminor sixth)

| C–↓↓A (dudmajor sixth)

| colspan="3" | C–Eb (minor third)

<nowiki/>*Can also be spelt ↓Gb and ↓↓Gb respectively, since F# = ↑Gb.

* 1–5/4–3/2 (C–↓E–G)

* 1–6/5–3/2 (C–↑Eb–G)

* 1–9/7–3/2 (C–↑E-G)

* 1–7/6–3/2 (C–↓Eb-G)

! [[Eigenmonzo|Unchanged interval<br>(eigenmonzo)]]*

| '''[[12edo|7\12]]'''

| '''700.0000'''

| '''Lower bound of 9-odd-limit, <br>2.3.5.7.19 subgroup 19- and 21-odd-limit diamond monotone'''

| [[65edo|38\65]]

| 65d val

| 701.6759

| 701.7108

| 701.7379

| 701.7596

| [[53edo|31\53]]

| 702.1928

| 702.2086

| 702.2267

| [[41edo|24\41]]

| 702.7775

| 702.9146

| '''[[29edo|17\29]]'''

| '''703.4483'''

| '''Upper bound of 9-odd-limit, <br>2.3.5.7.19 subgroup 19- and 21-odd-limit diamond monotone'''

| 703.5968

! [[Eigenmonzo|Unchanged interval<br>(eigenmonzo)]]*

| '''[[12edo|7\12]]'''

| '''700.0000'''

| '''Lower bound of 9-odd-limit diamond monotone'''

| [[65edo|38\65]]

| 65def val

| 701.6759

| 701.7108

| 701.7379

| 701.7596

| '''[[53edo|31\53]]'''

| '''701.8868'''

| '''Lower bound of 11-, 13-, 15-odd-limit, <br>2.3.5.7.11.13.19 subgroup 19- and 21-odd-limit diamond monotone'''

| 702.0264

| 702.0301

| 702.0343

| 702.0969

| 702.1016

| 702.1089

| 702.1277

| 702.1928

| 702.2086

| 702.2267

| 702.2295

| 702.2312

| 702.2438

| 702.2575

| '''[[41edo|24\41]]'''

| '''702.4390'''

| '''Upper bound of 11-, 13-, 15-odd-limit, <br>2.3.5.7.11.13.19 subgroup 19- and 21-odd-limit diamond monotone'''

| 702.7775

| 702.9146

| '''[[29edo|17\29]]'''

| '''703.4483'''

| '''29ef val, upper bound of 9-odd-limit diamond monotone'''

| 703.5968

! Unchanged interval<br>(eigenmonzo)*

| '''[[12edo|7\12]]'''

| '''700.0000'''

| '''Lower bound of 9- and 11-odd-limit diamond monotone'''

| [[65edo|38\65]]

| 65deeff val

| 701.6759

| 701.7108

| 701.7379

| 701.7596

| [[53edo|31\53]]

| 53ef val

| 702.1928

| 702.2086

| 702.2267

| '''[[41edo|24\41]]'''

| '''702.4390'''

| '''Lower bound of 13-, 15-odd-limit, <br>2.3.5.7.11.13.19 subgroup 19- and 21-odd-limit diamond monotone'''

| 702.6296

| 702.6651

| 702.7046

| 702.7558

| 702.7775

| 702.7922

| 702.8320

| 702.9146

| 703.3592

| 703.4101

| '''[[29edo|17\29]]'''

| '''703.4483'''

| '''Upper bound of 9-, 11-, 13-, 15-odd-limit, <br>2.3.5.7.11.13.19 subgroup 19- and 21-odd-limit diamond monotone'''

| 703.4996

| 703.5220

| 703.5968

| 704.0426

| 704.3770

! Unchanged interval<br>(eigenmonzo)*

| '''[[12edo|7\12]]'''

| '''700.0000'''

| '''Lower bound of 9- and 11-odd-limit diamond monotone'''

| 701.0942

| 701.4894

| '''[[65edo|38\65]]'''

| '''701.5385'''

| '''65d val, lower bound of 13-, 15-odd-limit, <br>2.3.5.7.11.13.19 subgroup 19- and 21-odd-limit diamond monotone'''

| 701.5907

| 701.6066

| 701.6227

| 701.6335

| 701.6435

| 701.6759

| 701.7108

| 701.7379

| 701.7596

| 701.8022

| 701.8067

| 701.8109

| 701.8314

| 701.8362

| '''[[53edo|31\53]]'''

| '''701.8868'''

| '''Upper bound of 11-, 13-, 15-odd-limit, <br>2.3.5.7.11.13.19 subgroup 19- and 21-odd-limit diamond monotone'''

| 702.1928

| 702.2086

| 702.2267

| [[41edo|24\41]]

| 41ef val

| 702.7775

| 702.9146

| '''[[29edo|17\29]]'''

| '''703.4483'''

| '''29eeff val, upper bound of 9-odd-limit diamond monotone'''

| 703.5968

<nowiki/>* Besides the octave