10 124 Further Notes and Views: Difference between revisions

Revision as of 09:45, 18 October 2005

If one takes the symmetric diagram for 10_123 and makes it doubly alternating one gets a diagram for 10_124. That's the torus knot view. There is then a nice representation of the quandle of 10_124 into the dodecahedral quandle $Q_{3}0$ . See [1].

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	If one takes the symmetric diagram for [[10_123]] and makes it doubly alternating one gets a diagram for 10_124. That's the torus knot view. There is then a nice representation of the quandle of 10_124 into the dodecahedral quandle Q_30. See [http://www.maths.warwick.ac.uk/~bjs/add233.html].		If one takes the symmetric diagram for [[10_123]] and makes it doubly alternating one gets a diagram for [[10_124]]. That's the torus knot view. There is then a nice representation of the quandle of [[10_124]] into the dodecahedral quandle <math>Q_30</math>. See [http://www.maths.warwick.ac.uk/~bjs/add233.html].

10 124 Further Notes and Views: Difference between revisions

Revision as of 09:45, 18 October 2005

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