Canonical extension
From Xenharmonic Reference
This page or section is a work in progress. It may lack sufficient justification, content, or organization, and is subject to future overhaul.
This is a technical or mathematical page. While the subject may be of some relevance to music, the page treats the subject in technical language.
(The page is marked as problematic because the definition of naturalness needs to be made more rigorous)
Let T be a regular temperament on JI group G. A strong extension U of T, on a JI group H of one rank higher than G is natural if the commas tempered out by T induces the presence of the added basis element of H. A strong extension is merely canonical if it is agreed that it is an efficient (accurate and low-complexity) extension.
