Monotone-MOS scale: Difference between revisions
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A [[ternary scale]] in L > M > s > 0 is '''monotone-MOS''' if it becomes a MOS under all three of the identifications L = M, M = s, and s = 0. If ''any'' (not necessarily all) of the identifications make the scale a MOS, the scale is said to ''satisfy '''a''' monotone-MOS property''. This property is used in [[aberrismic theory]]. | A [[ternary scale]] in L > M > s > 0 is '''monotone-MOS''' if it becomes a MOS under all three of the identifications L = M, M = s, and s = 0. If ''any'' (not necessarily all) of the identifications make the scale a MOS, the scale is said to ''satisfy '''a''' monotone-MOS property''. This property is used in [[aberrismic theory]]. | ||
[[Regular MV3 scale]]s satisfy all 3 properties and hence are monotone-MOS. They are also [[deletion-MOS scale]]s. | [[Regular MV3 scale]]s satisfy all 3 properties and hence are monotone-MOS. They are also [[pairwise-MOS]] and [[deletion-MOS scale]]s. | ||
The term ''monotone-MOS'' was coined by Tom Price. | The term ''monotone-MOS'' was coined by Tom Price. | ||
[[Category:Aberrismic theory]] | [[Category:Aberrismic theory]] | ||
Revision as of 21:50, 14 August 2024
A ternary scale in L > M > s > 0 is monotone-MOS if it becomes a MOS under all three of the identifications L = M, M = s, and s = 0. If any (not necessarily all) of the identifications make the scale a MOS, the scale is said to satisfy a monotone-MOS property. This property is used in aberrismic theory.
Regular MV3 scales satisfy all 3 properties and hence are monotone-MOS. They are also pairwise-MOS and deletion-MOS scales.
The term monotone-MOS was coined by Tom Price.