Tenney norm
If p/q is a positive rational number reduced to its lowest terms, then the Benedetti height is the integer pq. Often it is more convenient instead to take the logarithm, usually base 2 (log2), of the Benedetti height, leading to Tenney height. In either form it is widely used as a measure of inharmonicity and/or complexity for intervals. It is also known as log product complexity.
The Tenney height of a monzo b = [bπ (2) bπ (3) … bπ (p)⟩ is given by
[math]\displaystyle{ \lVert W^{-1}b \rVert = \vert b_{\pi (2)} \vert + \log_2 (3) \vert b_{\pi (3)} \vert + \ldots + \log_2 (p) \vert b_{\pi (p)} \vert = \log_2 (2^{|b_{\pi (2)}|} \cdot 3^{|b_{\pi (2)}|} \cdot \ldots \cdot p^{|b_{\pi (p)}|}) }[/math]
where W is the Tenney weighter such that, for the prime basis Q = ⟨2 3 5 … p],
[math]\displaystyle{ W = \operatorname {diag} (1/log_2 (Q)) }[/math]
Examples
| Interval name | Ratio (p/q) | Monzo | Tenney height | log2(p*q) |
|---|---|---|---|---|
| unison | 1/1 | [0⟩ | 0 | log2(1) |
| octave | 2/1 | [1⟩ | 1 | log2(1) |
| just perfect fifth | 3/2 | [-1 1⟩ | 2.585 | log2(6) |
| just major third | 5/4 | [-2 0 1⟩ | 4.322 | log2(20) |
| harmonic seventh | 7/4 | [-2 0 0 1⟩ | 4.807 | log2(28) |