I've heard it said that the fundamental chord of the Bohlen Pierce 7 odd limit just intonation scale is [3:5:7], otonally. In frequency ratios that's
[1/1, 5/3, 7/3]
If we use regular intervals instead of BP intervals to analyze the harmony, that's the just tuning of
[P1, M6, Sbm10]
The Bohlen Piece scales don't have octaves, but my ear still has octave equivalence, so I hear that as a spread out voicing of
[P1, Sbm3, M6] # [1/1, 7/6, 5/3]
Since BP doesn't have octaves, you might also think it's odd to do cyclic inversion of chords at the octave, but my ear has octave equivalence, so this chord has a similar sonority to me as does:
[P1, SpA4, SpM6] # [1/1, 10/7, 12/7]
And
[P1, m3, Sbd5] # [1/1, 6/5, 7/5]
This last version has a tertian spelling, and I consider that the canonical form for presentation. So I think the fundamental [3:5:7] chord of BP music is a rotated and spread out version of this diminished chord with a septimal alteration on the fifth. This chord does indeed show up a in the Bohlen Pierce scale. For example, the chord is outlined by the [0th, 6th, and 10th] notes of the scale, and five other places besides that:
^[0, 6, 10]
^[1, 7, 11]
^[3, 9, 13]
^[7, 13, 17]
^[9, 15, 19]
^[11, 17, 21]
What other chords can we make between scale degrees of BP?
Here's the scale for reference (in standard intervals, not BP intervals):
P1 # 1/1
Acm2 # 27/25
SpA2 # 25/21
SpM3 # 9/7
Sbd5 # 7/5
SpSpAA4 # 75/49
M6 # 5/3
m7 # 9/5
SbSbAcd9 # 49/25
SpA8 # 15/7
Sbm10 # 7/3
SbAcd11 # 63/25
A11 # 25/9
P12 # 3/1
This scale doesn't repeat at the octave, it repeats at the decade/tritave/P12, so that all the scale steps in the next decade have just tunings that are 3 times the ones above:
P12 # 3/1
Acm13 # 81/25
SpA13 # 25/7
SpM14 # 27/7
SbAcm16 # 21/5
SpSpAA15 # 225/49
M17 # 5/1
Ac18 # 27/5
SbSbAcd20 # 147/25
SpA19 # 45/7
Sbm21 # 7/1
SbAcd22 # 189/25
A22 # 25/3
AcM23 # 9/1
Here are 91 chords that you can make between BP scale degrees (with octave reduced forms on the right hand side of the colon). These are all tertian spellings - I've inverted the chords at the octave if they were ^[1, 3, 6] or ^[1, 4, 6] chords. This might seem overwhelming at first, but the BP scale has one more note than a chromatic scale, so there should be lots of available chords. And there are other crazier chords besides these that you can make of course, but I thought these looked fairly tame.
^[0, 12, 15] # [1/1, 25/9, 25/7] : [P1, SpM3, d5]
^[0, 14, 20] # [1/1, 81/25, 27/5] : [P1, m3, Gr5]
^[0, 6, 12] # [1/1, 5/3, 25/9] : [P1, m3, d5]
^[0, 6, 19] # [1/1, 5/3, 5/1] : [P1, m3, P5]
^[0, 6, 10] # [1/1, 5/3, 7/3] : [P1, m3, Sbd5]
^[0, 19, 22] # [1/1, 5/1, 45/7] : [P1, M3, SpA5]
^[0, 13, 19] # [1/1, 3/1, 5/1] : [P1, M3, P5]
^[0, 4, 19] # [1/1, 7/5, 5/1] : [P1, M3, Sbd5]
^[0, 4, 10] # [1/1, 7/5, 7/3] : [P1, Sbm3, Sbd5]
^[0, 10, 13] # [1/1, 7/3, 3/1] : [P1, Sbm3, P5]
^[0, 10, 22] # [1/1, 7/3, 45/7] : [P1, Sbm3, SpA5]
^[0, 15, 19] # [1/1, 25/7, 5/1] : [P1, Sbd3, Sbd5]
^[0, 3, 6] # [1/1, 9/7, 5/3] : [P1, m3, Sp5]
^[0, 3, 13] # [1/1, 9/7, 3/1] : [P1, SpM3, P5]
^[0, 3, 4] # [1/1, 9/7, 7/5] : [P1, SpM3, Sbd5]
^[0, 3, 15] # [1/1, 9/7, 25/7] : [P1, Sbd3, d5]
^[0, 3, 22] # [1/1, 9/7, 45/7] : [P1, SpM3, SpA5]
^[1, 14, 20] # [27/25, 81/25, 27/5] : [P1, M3, P5]
^[1, 13, 23] # [27/25, 3/1, 7/1] : [P1, Sbm3, d5]
^[1, 13, 16] # [27/25, 3/1, 27/7] : [P1, SpM3, d5]
^[1, 11, 14] # [27/25, 63/25, 81/25] : [P1, Sbm3, P5]
^[1, 4, 23] # [27/25, 7/5, 7/1] : [P1, M3, Sp5]
^[1, 4, 7] # [27/25, 7/5, 9/5] : [P1, SpM3, Sp5]
^[1, 16, 20] # [27/25, 27/7, 27/5] : [P1, Sbd3, Sbd5]
^[1, 7, 20] # [27/25, 9/5, 27/5] : [P1, m3, P5]
^[1, 7, 13] # [27/25, 9/5, 3/1] : [P1, m3, d5]
^[1, 7, 11] # [27/25, 9/5, 63/25] : [P1, m3, Sbd5]
^[2, 12, 15] # [25/21, 25/9, 25/7] : [P1, Sbm3, P5]
^[2, 6, 12] # [25/21, 5/3, 25/9] : [P1, Sbm3, Sbd5]
^[2, 16, 22] # [25/21, 27/7, 45/7] : [P1, m3, Gr5]
^[2, 5, 6] # [25/21, 75/49, 5/3] : [P1, SpM3, Sbd5]
^[2, 5, 15] # [25/21, 75/49, 25/7] : [P1, SpM3, P5]
^[3, 6, 25] # [9/7, 5/3, 25/3] : [P1, M3, Sp5]
^[3, 6, 9] # [9/7, 5/3, 15/7] : [P1, SpM3, Sp5]
^[3, 13, 16] # [9/7, 3/1, 27/7] : [P1, Sbm3, P5]
^[3, 9, 13] # [9/7, 15/7, 3/1] : [P1, m3, Sbd5]
^[3, 9, 15] # [9/7, 15/7, 25/7] : [P1, m3, d5]
^[3, 9, 22] # [9/7, 15/7, 45/7] : [P1, m3, P5]
^[3, 15, 25] # [9/7, 25/7, 25/3] : [P1, Sbm3, d5]
^[3, 15, 18] # [9/7, 25/7, 225/49] : [P1, SpM3, d5]
^[3, 16, 22] # [9/7, 27/7, 45/7] : [P1, M3, P5]
^[3, 18, 22] # [9/7, 225/49, 45/7] : [P1, Sbd3, Sbd5]
^[3, 7, 13] # [9/7, 9/5, 3/1] : [P1, Sbm3, Sbd5]
^[3, 7, 22] # [9/7, 9/5, 45/7] : [P1, M3, Sbd5]
^[5, 9, 15] # [75/49, 15/7, 25/7] : [P1, Sbm3, Sbd5]
^[5, 15, 18] # [75/49, 25/7, 225/49] : [P1, Sbm3, P5]
^[4, 19, 23] # [7/5, 5/1, 7/1] : [P1, Sbd3, Sbd5]
^[4, 17, 23] # [7/5, 21/5, 7/1] : [P1, M3, P5]
^[4, 8, 23] # [7/5, 49/25, 7/1] : [P1, M3, Sbd5]
^[4, 10, 23] # [7/5, 7/3, 7/1] : [P1, m3, P5]
^[4, 23, 26] # [7/5, 7/1, 9/1] : [P1, M3, SpA5]
^[4, 7, 26] # [7/5, 9/5, 9/1] : [P1, SpM3, SpA5]
^[4, 7, 19] # [7/5, 9/5, 5/1] : [P1, Sbd3, d5]
^[4, 7, 17] # [7/5, 9/5, 21/5] : [P1, SpM3, P5]
^[4, 7, 8] # [7/5, 9/5, 49/25] : [P1, SpM3, Sbd5]
^[4, 7, 10] # [7/5, 9/5, 7/3] : [P1, m3, Sp5]
^[6, 12, 25] # [5/3, 25/9, 25/3] : [P1, m3, P5]
^[6, 20, 26] # [5/3, 27/5, 9/1] : [P1, m3, Gr5]
^[6, 19, 25] # [5/3, 5/1, 25/3] : [P1, M3, P5]
^[6, 10, 25] # [5/3, 7/3, 25/3] : [P1, M3, Sbd5]
^[6, 9, 12] # [5/3, 15/7, 25/9] : [P1, m3, Sp5]
^[6, 9, 19] # [5/3, 15/7, 5/1] : [P1, SpM3, P5]
^[6, 9, 10] # [5/3, 15/7, 7/3] : [P1, SpM3, Sbd5]
^[7, 20, 26] # [9/5, 27/5, 9/1] : [P1, M3, P5]
^[7, 19, 22] # [9/5, 5/1, 45/7] : [P1, SpM3, d5]
^[7, 13, 26] # [9/5, 3/1, 9/1] : [P1, m3, P5]
^[7, 13, 19] # [9/5, 3/1, 5/1] : [P1, m3, d5]
^[7, 13, 17] # [9/5, 3/1, 21/5] : [P1, m3, Sbd5]
^[7, 11, 26] # [9/5, 63/25, 9/1] : [P1, M3, Sbd5]
^[7, 11, 17] # [9/5, 63/25, 21/5] : [P1, Sbm3, Sbd5]
^[7, 17, 20] # [9/5, 21/5, 27/5] : [P1, Sbm3, P5]
^[7, 10, 13] # [9/5, 7/3, 3/1] : [P1, SpM3, Sp5]
^[7, 22, 26] # [9/5, 45/7, 9/1] : [P1, Sbd3, Sbd5]
^[9, 12, 15] # [15/7, 25/9, 25/7] : [P1, SpM3, Sp5]
^[9, 19, 22] # [15/7, 5/1, 45/7] : [P1, Sbm3, P5]
^[9, 13, 19] # [15/7, 3/1, 5/1] : [P1, Sbm3, Sbd5]
^[9, 15, 19] # [15/7, 25/7, 5/1] : [P1, m3, Sbd5]
^[15, 19, 25] # [25/7, 5/1, 25/3] : [P1, Sbm3, Sbd5]
^[15, 18, 19] # [25/7, 225/49, 5/1] : [P1, SpM3, Sbd5]
^[8, 11, 21] # [49/25, 63/25, 147/25] : [P1, SpM3, P5]
^[8, 11, 23] # [49/25, 63/25, 7/1] : [P1, Sbd3, d5]
^[10, 13, 25] # [7/3, 3/1, 25/3] : [P1, Sbd3, d5]
^[10, 13, 23] # [7/3, 3/1, 7/1] : [P1, SpM3, P5]
^[11, 14, 26] # [63/25, 81/25, 9/1] : [P1, Sbd3, d5]
^[11, 14, 24] # [63/25, 81/25, 189/25] : [P1, SpM3, P5]
^[11, 14, 17] # [63/25, 81/25, 21/5] : [P1, m3, Sp5]
^[11, 17, 21] # [63/25, 21/5, 147/25] : [P1, m3, Sbd5]
^[11, 17, 23] # [63/25, 21/5, 7/1] : [P1, m3, d5]
^[11, 21, 24] # [63/25, 147/25, 189/25] : [P1, Sbm3, P5]
^[11, 23, 26] # [63/25, 7/1, 9/1] : [P1, SpM3, d5]
^[12, 15, 25] # [25/9, 25/7, 25/3] : [P1, SpM3, P5]
Across this set of 91 chords, some chord forms are repeated. There are really only 20 distinct sounds here:
[P1, Sbd3, Sbd5] # [1/1, 28/25, 7/5]
[P1, Sbd3, d5] # [1/1, 28/25, 36/25]
[P1, Sbm3, P5] # [1/1, 7/6, 3/2]
[P1, Sbm3, Sbd5] # [1/1, 7/6, 7/5]
[P1, Sbm3, SpA5] # [1/1, 7/6, 45/28]
[P1, Sbm3, d5] # [1/1, 7/6, 36/25]
[P1, m3, Gr5] # [1/1, 6/5, 40/27]
[P1, m3, P5] # [1/1, 6/5, 3/2]
[P1, m3, Sbd5] # [1/1, 6/5, 7/5]
[P1, m3, Sp5] # [1/1, 6/5, 54/35]
[P1, m3, d5] # [1/1, 6/5, 36/25]
[P1, M3, P5] # [1/1, 5/4, 3/2]
[P1, M3, Sbd5] # [1/1, 5/4, 7/5]
[P1, M3, Sp5] # [1/1, 5/4, 54/35]
[P1, M3, SpA5] # [1/1, 5/4, 45/28]
[P1, SpM3, P5] # [1/1, 9/7, 3/2]
[P1, SpM3, Sbd5] # [1/1, 9/7, 7/5]
[P1, SpM3, Sp5] # [1/1, 9/7, 54/35]
[P1, SpM3, SpA5] # [1/1, 9/7, 45/28]
[P1, SpM3, d5] # [1/1, 9/7, 36/25]
I'd say that these are the core triadic harmonies available in Bohlen Pierce music, even though they have factors of 2 in the frequency ratios and the just intonation BP scale doesn't.
