Interesting Esoterica

Braids which can be plaited with their threads tied together at each end

Article by J.A.H. Shepperd
  • Published in 1962
  • Added on
The group of braids, which can be plaited from n untwisted threads tied together at each end, is examined and its structure is determined. An algorithm is derived for deciding whether or not a given braid can be so plaited and a calculation procedure is described. The problem arises from a process of manufacturing braids by a machine which plaits by passing a shuttle, on which the constructed braid is wound, between the threads, which are supplied from bobbins effectively fixed and inaccessible. Every plait on three threads can be constructed in this way. For more than three threads, examples are given both of plaits which can be so constructed and of plaits which cannot.

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key
Braidswhichcanbeplaitedwiththeirthreadstiedtogetherateachend
type
article
date_added
2021-02-12
date_published
1962-12-07

BibTeX entry

@article{Braidswhichcanbeplaitedwiththeirthreadstiedtogetherateachend,
	key = {Braidswhichcanbeplaitedwiththeirthreadstiedtogetherateachend},
	type = {article},
	title = {Braids which can be plaited with their threads tied together at each end},
	author = {J.A.H. Shepperd},
	abstract = {The group of braids, which can be plaited from n untwisted threads tied together at each end, is examined and its structure is determined. An algorithm is derived for deciding whether or not a given braid can be so plaited and a calculation procedure is described. The problem arises from a process of manufacturing braids by a machine which plaits by passing a shuttle, on which the constructed braid is wound, between the threads, which are supplied from bobbins effectively fixed and inaccessible. Every plait on three threads can be constructed in this way. For more than three threads, examples are given both of plaits which can be so constructed and of plaits which cannot.},
	comment = {},
	date_added = {2021-02-12},
	date_published = {1962-12-07},
	urls = {https://royalsocietypublishing.org/doi/10.1098/rspa.1962.0006},
	collections = {fun-maths-facts,the-groups-group,things-to-make-and-do},
	url = {https://royalsocietypublishing.org/doi/10.1098/rspa.1962.0006},
	year = 1962,
	urldate = {2021-02-12}
}