From ae1b69cf4b99c8852e6e8648fb71451c51a983eb Mon Sep 17 00:00:00 2001 From: simon Date: Fri, 22 Mar 2019 17:20:36 +0100 Subject: [PATCH] pages/please_to_foshan.html --- pages/please_to_foshan.html | 4 ++-- 1 file changed, 2 insertions(+), 2 deletions(-) diff --git a/pages/please_to_foshan.html b/pages/please_to_foshan.html index 2afc465..bd9f142 100644 --- a/pages/please_to_foshan.html +++ b/pages/please_to_foshan.html @@ -30,9 +30,9 @@

Mathematical knots

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Mathematical knots, or

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Mathematical knots, or knots which are studied in the field of knot theory, are based on the embedding of a circle within three-dimensional space. They are different from the usual idea of a knot, that is a string with free ends. Therefore, mathematical knots are (almost) always considered to be closed loops.

Knotworks

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Knotworks are visualisations of network topologies which use mathematical knots to represent a collapsing of the distinction between node and link. Just as a knot is a complication in which the tangle can conceal parts contained (as in klein worm topologies), unravelling the knot reveals that it is homeomorphic to a continuous link. The link and the node are the same, unravelled.

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Knotworks are visualisations of network topologies which use mathematical knots to represent a collapsing of the distinction between node and link. Just as a knot is a complication in which the tangle can conceal parts contained (as in klein worm topologies), unravelling the knot reveals that it is homeomorphic to a continuous link. The link and the node are the same, unravelled.