On the topology of the permutation pattern poset
- Submitting institution
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University of Strathclyde
- Unit of assessment
- 11 - Computer Science and Informatics
- Output identifier
- 45362378
- Type
- D - Journal article
- DOI
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10.1016/j.jcta.2015.02.009
- Title of journal
- Journal of Combinatorial Theory Series A
- Article number
- -
- First page
- 1
- Volume
- 134
- Issue
- -
- ISSN
- 0097-3165
- Open access status
- Out of scope for open access requirements
- Month of publication
- March
- Year of publication
- 2015
- URL
-
-
- Supplementary information
-
-
- Request cross-referral to
- 10 - Mathematical Sciences
- Output has been delayed by COVID-19
- No
- COVID-19 affected output statement
- -
- Forensic science
- No
- Criminology
- No
- Interdisciplinary
- No
- Number of additional authors
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1
- Research group(s)
-
-
- Citation count
- 9
- Proposed double-weighted
- No
- Reserve for an output with double weighting
- No
- Additional information
- This paper was instrumental for the following papers by J. P. Smith, the first three supported by an EPSRC grant (PI Steingrimsson):
On the Möbius function and topology of general pattern posets. Electron. J. Combin. 26 (2019-1), 1.49.
A formula for the Möbius function of the permutation poset based on a topological decomposition. Adv. in Appl. Math. 91 (2017).
Intervals of permutations with a fixed number of descents are shellable. Discrete Math. 339 (2016-1).
On the Möbius function of permutations with one descent. Electron. J. Combin. 21 (2014-2), 2.11.
- Author contribution statement
- -
- Non-English
- No
- English abstract
- -