Lumatone mapping for 32edo: Difference between revisions
Jump to navigation
Jump to search
ArrowHead294 (talk | contribs) mNo edit summary |
→Diatonic: Add Bryan Deister's pseudo-diatonic pseudo-isomorphic mapping |
||
| Line 3: | Line 3: | ||
== Diatonic == | == Diatonic == | ||
{{Lumatone EDO mapping|n=32|start=8|xstep=6|ystep=-5}} | {{Lumatone EDO mapping|n=32|start=8|xstep=6|ystep=-5}} | ||
== Pseudo-Isomorphic Pseudo-Diatonic == | |||
A pseudo-isomorphic pseudo-diatonic mapping for [[32edo]] that duplicates note 0 as note 32 in a mapping taken from [[33edo]] yields an alternate approach to diatonic playing, as demonstrated in [https://www.youtube.com/shorts/nTQfjPjeee8 ''32edo improv''] (2025). | |||
{{Lumatone EDO mapping|n=33|start=27|xstep=5|ystep=-1}} | |||
== Sixix == | == Sixix == | ||
Revision as of 06:15, 12 October 2025
There are many conceivable ways to map 32edo onto the onto the Lumatone keyboard. Only one, however, agrees with the Standard Lumatone mapping for Pythagorean.
Diatonic
8
14
9
15
21
27
1
4
10
16
22
28
2
8
14
5
11
17
23
29
3
9
15
21
27
1
0
6
12
18
24
30
4
10
16
22
28
2
8
14
1
7
13
19
25
31
5
11
17
23
29
3
9
15
21
27
1
28
2
8
14
20
26
0
6
12
18
24
30
4
10
16
22
28
2
8
14
29
3
9
15
21
27
1
7
13
19
25
31
5
11
17
23
29
3
9
15
21
27
1
24
30
4
10
16
22
28
2
8
14
20
26
0
6
12
18
24
30
4
10
16
22
28
2
8
14
31
5
11
17
23
29
3
9
15
21
27
1
7
13
19
25
31
5
11
17
23
29
3
9
15
21
27
1
12
18
24
30
4
10
16
22
28
2
8
14
20
26
0
6
12
18
24
30
4
10
16
22
28
2
31
5
11
17
23
29
3
9
15
21
27
1
7
13
19
25
31
5
11
17
23
29
3
12
18
24
30
4
10
16
22
28
2
8
14
20
26
0
6
12
18
24
30
31
5
11
17
23
29
3
9
15
21
27
1
7
13
19
25
31
12
18
24
30
4
10
16
22
28
2
8
14
20
26
31
5
11
17
23
29
3
9
15
21
27
12
18
24
30
4
10
16
22
31
5
11
17
23
12
18
Pseudo-Isomorphic Pseudo-Diatonic
A pseudo-isomorphic pseudo-diatonic mapping for 32edo that duplicates note 0 as note 32 in a mapping taken from 33edo yields an alternate approach to diatonic playing, as demonstrated in 32edo improv (2025).
27
32
31
3
8
13
18
30
2
7
12
17
22
27
32
1
6
11
16
21
26
31
3
8
13
18
0
5
10
15
20
25
30
2
7
12
17
22
27
32
4
9
14
19
24
29
1
6
11
16
21
26
31
3
8
13
18
3
8
13
18
23
28
0
5
10
15
20
25
30
2
7
12
17
22
27
32
7
12
17
22
27
32
4
9
14
19
24
29
1
6
11
16
21
26
31
3
8
13
18
6
11
16
21
26
31
3
8
13
18
23
28
0
5
10
15
20
25
30
2
7
12
17
22
27
32
15
20
25
30
2
7
12
17
22
27
32
4
9
14
19
24
29
1
6
11
16
21
26
31
3
8
13
18
29
1
6
11
16
21
26
31
3
8
13
18
23
28
0
5
10
15
20
25
30
2
7
12
17
22
15
20
25
30
2
7
12
17
22
27
32
4
9
14
19
24
29
1
6
11
16
21
26
29
1
6
11
16
21
26
31
3
8
13
18
23
28
0
5
10
15
20
25
15
20
25
30
2
7
12
17
22
27
32
4
9
14
19
24
29
29
1
6
11
16
21
26
31
3
8
13
18
23
28
15
20
25
30
2
7
12
17
22
27
32
29
1
6
11
16
21
26
31
15
20
25
30
2
29
1
Sixix
Note that since 32edo is a ultrapyth temperament, the best approximation to 5/4 is a doubly-augmented unison, which makes for awkward fingerings. The sixix mapping makes the 5-limit as easily accessible as possible while also maximising the range.
30
7
3
12
21
30
7
31
8
17
26
3
12
21
30
4
13
22
31
8
17
26
3
12
21
30
0
9
18
27
4
13
22
31
8
17
26
3
12
21
5
14
23
0
9
18
27
4
13
22
31
8
17
26
3
12
21
1
10
19
28
5
14
23
0
9
18
27
4
13
22
31
8
17
26
3
12
6
15
24
1
10
19
28
5
14
23
0
9
18
27
4
13
22
31
8
17
26
3
12
2
11
20
29
6
15
24
1
10
19
28
5
14
23
0
9
18
27
4
13
22
31
8
17
26
3
16
25
2
11
20
29
6
15
24
1
10
19
28
5
14
23
0
9
18
27
4
13
22
31
8
17
26
3
7
16
25
2
11
20
29
6
15
24
1
10
19
28
5
14
23
0
9
18
27
4
13
22
31
8
7
16
25
2
11
20
29
6
15
24
1
10
19
28
5
14
23
0
9
18
27
4
13
30
7
16
25
2
11
20
29
6
15
24
1
10
19
28
5
14
23
0
9
30
7
16
25
2
11
20
29
6
15
24
1
10
19
28
5
14
21
30
7
16
25
2
11
20
29
6
15
24
1
10
21
30
7
16
25
2
11
20
29
6
15
12
21
30
7
16
25
2
11
12
21
30
7
16
3
12