Monotonicity limits of small EDOs: Difference between revisions
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An [[edo]] ''N'' is monotone with respect to a set of rational numbers ''S'' if there exists a mapping for ''N'' that preserves each elements's size order. If ''S'' is the [[Odd limit|''q''-odd-limit]] diamond, we say ''N'' is ''q''-odd-limit monotone. Below is a table of every edo up to | An [[edo]] ''N'' is monotone with respect to a set of rational numbers ''S'' if there exists a mapping for ''N'' that preserves each elements's size order. If ''S'' is the [[Odd limit|''q''-odd-limit]] diamond, we say ''N'' is ''q''-odd-limit monotone. Below is a table of every edo up to 53. | ||
{| class="wikitable sortable mw-collapsible right-all left-3" | {| class="wikitable sortable mw-collapsible right-all left-3" | ||
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| 41 || 21 || 41 | | 41 || 21 || 41 | ||
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| 42 || 13 || 42ef | |||
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| 43 || 17 || 43 | |||
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| 44 || 19 || 44 | |||
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| 45 || 13 || 45ef | |||
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| 46 || 17 || 46 | |||
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| 47 || 13 || 47ccde or 47bcff | |||
|- | |||
| 48 || 21 || 48c | |||
|- | |||
| 49 || 15 || 49f | |||
|- | |||
| 50 || 19 || 50 | |||
|- | |||
| 51 || 15 || 51 | |||
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| 52 || 13 || 52c [26] | |||
|- | |||
| 53 || 23 || 53e | |||
|} | |} | ||