Difference between revisions of "Torus"
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| − | [[Nodal/List/Loop|Loops]] can be considered as ''sets'' or ''spaces'' more closely than other kinds of lists because every item is geometrically | + | [[Nodal/List/Loop|Loops]] can be considered as ''sets'' or ''spaces'' more closely than other kinds of lists because every item is geometrically indistinguishable - none are the start or end; there's no center, inside or outside. In geometric terms, all the points of the loop form the surface of a 1-sphere. |
| − | The loops actually form a hierarchy since each item in a loop can also be a loop. Geometrically this forms a recursive torus - a torus is a circle where all the points composing the circumference are also circles. | + | The loops actually form a hierarchy, since each item in a loop can also be a loop. Geometrically this forms a recursive torus - a torus is a circle where all the points composing the circumference are also circles. |
| − | There is a concept | + | There is a concept of ''order'' and a concept of ''matching'' that combine in execution... |
[[Category:Nodal Concepts]] | [[Category:Nodal Concepts]] | ||
Revision as of 19:45, 12 January 2011
Loops can be considered as sets or spaces more closely than other kinds of lists because every item is geometrically indistinguishable - none are the start or end; there's no center, inside or outside. In geometric terms, all the points of the loop form the surface of a 1-sphere.
The loops actually form a hierarchy, since each item in a loop can also be a loop. Geometrically this forms a recursive torus - a torus is a circle where all the points composing the circumference are also circles.
There is a concept of order and a concept of matching that combine in execution...
