RTT with ternary scales

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Given a ternary scale with step signature aLbmcs with gcd(a, b, c) = 1 and a JI subgroup, there exist linearly independent (possibly non-patent) vals a, a + b, and a + b + c that interpret the scale. Assuming the join is not contorted, a rank-3 temperament can now be defined as the join of these three vals.

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