User:CompactStar/Ordinal interval notation: Difference between revisions
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== Explanation == | == Explanation == | ||
All intervals are given a diatonic degree, calculated from their [[7edo]] [[patent val]] [[mapping]]. If k is a degree, the central k-th is the simplest (with respect to [[Tenney height]]) k-th which is within 20 cents of (k-1)\7edo | All intervals are given a diatonic degree, calculated from their [[7edo]] [[patent val]] [[mapping]]. If k is a degree, the central k-th is the simplest (with respect to [[Tenney height]]) k-th which is within 20 cents of (k-1)\7edo. The left k-th is the simplest k-th which is flatter than central, and the right k-th is the simplest k-th which is sharper than central. Central, left and right are abbreviated as C, L, and R respectively. | ||
Left and right can be used multiple times to produce more complex directions. For example, leftleft is flatter than left, leftright is between left and central, rightleft is between central and right, and rightright is sharper than right. Adding a left always means to go flatter, and adding a right always means to go sharper, with each new left/right having less and less of an impact. Formally, if k is a degree, X and Y are any sequence of lefts/rights: | Left and right can be used multiple times to produce more complex directions. For example, leftleft is flatter than left, leftright is between left and central, rightleft is between central and right, and rightright is sharper than right. Adding a left always means to go flatter, and adding a right always means to go sharper, with each new left/right having less and less of an impact. Formally, if k is a degree, X and Y are any sequence of lefts/rights: | ||
Revision as of 08:21, 23 July 2023
Lefts and rights notation is a notation for just intonation primarily developed by CompactStar. It represents every just interval as a sequence of lefts/rights (referred to as its direction) and a diatonic degree.
Explanation
All intervals are given a diatonic degree, calculated from their 7edo patent val mapping. If k is a degree, the central k-th is the simplest (with respect to Tenney height) k-th which is within 20 cents of (k-1)\7edo. The left k-th is the simplest k-th which is flatter than central, and the right k-th is the simplest k-th which is sharper than central. Central, left and right are abbreviated as C, L, and R respectively.
Left and right can be used multiple times to produce more complex directions. For example, leftleft is flatter than left, leftright is between left and central, rightleft is between central and right, and rightright is sharper than right. Adding a left always means to go flatter, and adding a right always means to go sharper, with each new left/right having less and less of an impact. Formally, if k is a degree, X and Y are any sequence of lefts/rights:
- Xleft k-th = the simplest just k-th whose direction starts with X and is flatter than the X k-th
- Xright k-th = the simplest just k-th whose direction starts with X and is sharper than the X k-th
Examples
Below are some examples of lefts and rights notation for 11-odd-limit intervals: