Telicity: Difference between revisions

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== Integer and Rational Telicity ==
== Integer and Rational Telicity ==


Harmonics, and especially primes, are fairly simple as both [[equave]]s and [[generator]]s when it comes to telicity, and since all of these interval ratios are integers, this type of telicity can be referred to specifically as '''integer telicity'''.  However, when the equave and or the generator are combinations of primes, things are more complicated, leading to the broader term '''rational telicity''' as a descriptor for this second type of telicity.
Harmonics, and especially primes, are fairly simple as both [[equave]]s and [[generator]]s when it comes to telicity, and since all of these interval ratios are integers, this type of telicity can be referred to specifically as '''integer telicity'''.  However, when the equave and or the generator are a combination of primes, things are more complicated, leading to the broader term '''rational telicity''' as a descriptor for this second type of telicity.


== Telicity On Subgroups ==
== Telicity On Subgroups ==