Maximal evenness: Difference between revisions
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Case 1: ME(''n'', ''m'') where {{nowrap|''n'' < {{frac|''m''|2}}}}. This is a maximally even subset of Z/mZ with step sizes {{nowrap|L > s > 1}}, which determines the locations of step sizes of 2 in the complement. The rest of the complement's step sizes are 1. The sizes of the chunks of 1 are {{nowrap|L − 2}} and {{nowrap|s − 2}} (0 is a valid chunk size), and the sizes form a maximally even MOS. | Case 1: ME(''n'', ''m'') where {{nowrap|''n'' < {{frac|''m''|2}}}}. This is a maximally even subset of Z/mZ with step sizes {{nowrap|L > s > 1}}, which determines the locations of step sizes of 2 in the complement. The rest of the complement's step sizes are 1. The sizes of the chunks of 1 are {{nowrap|L − 2}} and {{nowrap|s − 2}} (0 is a valid chunk size), and the sizes form a maximally even MOS. | ||
Case 2: ME(''n'', ''m'') where {{nowrap|''n'' > {{frac|''m''|2}}}}. This has step sizes 1 and 2. The chunks of 1 (of nonzero size since {{nowrap|''n'' > {{frac|''m''|2}}}} occupy a maximally even subset of the slots of ME(''n'', ''m'') (*). Now replace each 1 with "|" and each 2 with "$|". | Case 2: ME(''n'', ''m'') where {{nowrap|''n'' > {{frac|''m''|2}}}}. This has step sizes 1 and 2. The chunks of 1 (of nonzero size since {{nowrap|''n'' > {{frac|''m''|2}}}}) occupy a maximally even subset of the slots of ME(''n'', ''m'') (*). Now replace each 1 with "|" and each 2 with "$|". | ||
(e.g.) {{nowrap|2112111 → <nowiki>$|||$||||</nowiki>}} | (e.g.) {{nowrap|2112111 → <nowiki>$|||$||||</nowiki>}} | ||
Consider the resulting binary word of "|" and "$". The "|"s form chunks of sizes that differ by 1 and are distributed in a MOS way by (*). The desired complement, occupied by the "$"'s, thus forms a maximally even subset. | Consider the resulting binary word of "|" and "$". The "|"s form chunks of sizes that differ by 1 and are distributed in a MOS way by (*). The desired complement, occupied by the "$"'s, thus forms a maximally even subset. | ||
== Sound perception == | == Sound perception == | ||
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Let's say we want to see what would repeatedly stacking 11th harmonic do well in all of 11-limit, in an EDO that presents it well. | Let's say we want to see what would repeatedly stacking 11th harmonic do well in all of 11-limit, in an EDO that presents it well. | ||
11/8 amounts to 17 steps of 37edo, and the solution to the problem {{nowrap|17*''x'' (mod 1) {{=}} 37}} is 24, meaning if the generator is 11/8, we are dealing with a 24 tone maximally even scale. As such, the temperament we are looking for is 24 & 37, which can be interpreted as [[freivald]] or [[emka]]. | 11/8 amounts to 17 steps of 37edo, and the solution to the problem {{nowrap|17*''x'' (mod 1) {{=}} 37}} is 24, meaning if the generator is 11/8, we are dealing with a 24 tone maximally even scale. As such, the temperament we are looking for is {{nowrap|24 & 37}}, which can be interpreted as [[freivald]] or [[emka]]. | ||
=== Example 3: On-request maximum evenness scales === | === Example 3: On-request maximum evenness scales === | ||
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We simply merge {{nowrap|52 & 293}} in a selected limit to get our answer. Let's say 17 limit, we get a {{nowrap|52 & 243c}} temperament with a comma list 225/224, 715/714, 2880/2873, 22750/22627 and 60112/60025. | We simply merge {{nowrap|52 & 293}} in a selected limit to get our answer. Let's say 17 limit, we get a {{nowrap|52 & 243c}} temperament with a comma list 225/224, 715/714, 2880/2873, 22750/22627 and 60112/60025. | ||
[[Category:Scale]] | [[Category:Scale]] | ||
[[Category:Todo:cleanup]] | [[Category:Todo:cleanup]] | ||