Orwell on an isomorphic keyboard

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Isomorphic keyboard layouts can be useful for playing and composing in orwell and other regular temperaments. As pitch space in rank-2 temperaments is 2-dimensional, the structure can be directly mapped to a 2-dimensional array of keys.

Axis-49

The Axis-49 has 98 velocity-sensitive buttons arranged in a honeycomb pattern. One key mapping for orwell on the Axis-49 maps the orwell generator (approx. 272¢) to one move of "down and to the right" and the octave period to one move of "up and to the right" and three moves of "down and to the right". This gives the Orwell[13] mos scale the following shape on the Axis-49 keyboard:

orwell13_axis49.png

We can see from the diagram that just over four octaves are available on the Axis-49 keyboard (more on the Axis-64 or on other larger isomorphic keyboards). Note that the numbers above indicate multiples of the orwell generator (not ascending pitch order), ignoring octaves. Each duplicate number to the right is one octave higher than its counterpart to the left. The starting place is arbitrary; if we select another hex to be 0, we can build another Orwell[13] scale. Note also that the choice to focus here on the 13-tone mos is also somewhat arbitrary, as clearly more tones are available on the keyboard, represented by the hexes outlined in gray with no number.

To help with visualizing what an Orwell[13] "chromatic scale" looks like, note that the pitches in ascending order go: 0 9 5 1 10 6 2 11 7 3 12 8 4 0. The large step of Orwell[13] maps to one move upward (as well as -4 generators, e.g. 8 to 4). The small step of Orwell[13] maps to two moves downward and one move "down and to the right" (as well as +9 generators, e.g. 1 to 10). Thus, this (or any) 2-dimensional regular arrangement of the Orwell[13] scale makes it easy to distinguish between the two different step sizes, as they are represented by different "moves" on the keyboard.

Dyadic pentads and hexads of Orwell[13] on the Axis-49

The page Chords of orwell offers one system for identifying and naming dyadic chords available in orwell. The following diagrams show how some of those chords would map to an Axis-49 (or similar keyboard, e.g. Opal Chameleon) tuned as above. These diagrams only look at the pentads and hexads available in Orwell[13]. The "chords of orwell" page also lists triads and tetrads, as well as chords which require a generator chain larger than that of Orwell[13]. The "types" come from the "chords of orwell" page and say something about which commas must be tempered out (if any) for this chord to be possible.

At the time of writing, the essentially-tempered dyadic chords of orwell have been little explored; perhaps these diagrams will give isomorphic keyboardists some encouragement to explore them.

Pentads

orwell13_pentad01.pngorwell13_pentad02.pngorwell13_pentad03.png

orwell13_pentad04.pngorwell13_pentad05.pngorwell13_pentad06.png

orwell13_pentad07.pngorwell13_pentad08.pngorwell13_pentad09.png

orwell13_pentad10.pngorwell13_pentad11.pngorwell13_pentad12.png

orwell13_pentad13.pngorwell13_pentad14.pngorwell13_pentad15.png

orwell13_pentad16.pngorwell13_pentad17.pngorwell13_pentad18.png

orwell13_pentad19.pngorwell13_pentad20.pngorwell13_pentad21.png

orwell13_pentad22.pngorwell13_pentad23.pngorwell13_pentad24.png

orwell13_pentad25.pngorwell13_pentad26.pngorwell13_pentad27.png

orwell13_pentad28.pngorwell13_pentad29.pngorwell13_pentad30.png

orwell13_pentad31.pngorwell13_pentad32.pngorwell13_pentad33.png

orwell13_pentad34.pngorwell13_pentad35.png

Hexads

orwell13_hexad01.pngorwell13_hexad02.pngorwell13_hexad03.png

orwell13_hexad04.pngorwell13_hexad05.pngorwell13_hexad06.png

Scala file

The following Scala file is specifically for the Axis-49, which, in "selfless mode," can send a separate midi note on each of its 98 keys from note numbers 1 to 98. The tuning file will only work if it is set to start on midi note 1 ("C# -2" in "MIDI Standard", "C# -1" in "ISO 16:1975", and "C# 0" in "Cakewalk standard" – see this article for details on the variety of MIDI note-naming schemes). You can tell it is working if the same shape consistently produces the same pattern of intervals, i.e. if it is regularly mapped. It is left to the reader to choose a suitable base frequency for their purposes. 

! orwell53edo_-113x272_axis49.scl
A regular mapping of orwell temperament (53edo version) for the Axis-49 isomorphic keyboard.
97
!
-113.207548
-226.415096
-339.622644
-452.830192
-566.03774
-679.245288
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203.773582
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815.094339
701.886791
588.679243
475.471695
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1200.
1086.792452
973.584904
860.377356
747.169808
633.96226
1584.905661
1471.698113
1358.490565
1245.283017
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1018.867921
905.660373
1969.811322
1856.603774
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1516.98113
1403.773582
1290.566034
2241.509435
2128.301887
2015.094339
1901.886791
1788.679243
1675.471695
1562.264147
2513.207548
2400.
2286.792452
2173.584904
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1947.169808
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2784.905661
2671.698113
2558.490565
2445.283017
2332.075469
2218.867921
3169.811322
3056.603774
2943.396226
2830.188678
2716.98113
2603.773582
2490.566034
3554.716983
3441.509435
3328.301887
3215.094339
3101.886791
2988.679243
2875.471695
3826.415096
3713.207548
3600.
3486.792452
3373.584904
3260.377356
3147.169808
4211.320757
4098.113209
3984.905661
3871.698113
3758.490565
3645.283017
3532.075469
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