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| title: 'Turning cycle restrictions into mesh patterns via Foata's fundamental transformation' | ||
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| journal: Submitted | ||
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| authors: | ||
| - claesson | ||
| - ulfarsson | ||
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| projects: | ||
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| --- | ||
| {:align="right" height="200px"} | ||
| An adjacent q-cycle is a natural generalization of an adjacent | ||
| transposition. We show that the number of adjacent q-cycles in a | ||
| permutation maps to the sum of occurrences of two mesh patterns under | ||
| Foata's fundamental transformation. As a corollary we resolve | ||
| Conjecture 3.14 in the paper ''From Hertzprung's problem to | ||
| pattern-rewriting systems'' by the first author. | ||
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| This work was started at Schloss Dagstuhl (Leibniz-Zentrum fur Informatik), seminar 23121, and we thank the institute and the organizers for giving us the opportunity to participate. | ||
| <!-- The paragraph above is an adaptation of the abstract. 2023-04-06 --> | ||
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| ## Download the paper | ||
| <!-- - [{{ page.journal }}](https://cs.uwaterloo.ca/journals/JIS/VOL20/Bean/bean2.html) --> | ||
| - [arXiv](https://arxiv.org/abs/2303.17931) | ||
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| ## Presentations |
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