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| Description | Two topologically-equivalent representations of the L6n1 or (3,3) torus link of mathematical knot theory, in the form of linked rings (see http://www.liv.ac.uk/~spmr02/rings/types.html ). One configuration has 3-fold rotational symmetry, the other doesn't. Neither of them is the Borromean rings. | ||
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Self-made graphic, converted from a version of the following vector PostScript source code: %!
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| Author | AnonMoos | ||
| Permission (Reusing this file) |
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File history
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| Date/Time | Thumbnail | Dimensions | User | Comment | |
|---|---|---|---|---|---|
| current | 13:29, 5 July 2011 | | 800 × 385 (8 KB) | AnonMoos | streamline SVG |
| 13:03, 5 July 2011 |  | 800 × 385 (10 KB) | AnonMoos | Two topologically-equivalent representations of the [http://katlas.math.toronto.edu/wiki/L6n1 L6n1] or (3,3) torus link of mathematical knot theory, in the form of linked rings. One configuration has 3-fold rotational symmetry, the other doesn't. Neithe |
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