Immeasurable rotope (no ontology)
From Hi.gher. Space
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| + | An '''immeasurable rotope''' is a [[rotope]] which has a superscript letter inside a group in its [[group notation]] definition. | ||
| + | The effect of this is that the orientation of a non-spherical part of a group in the rotope is undefined, making it impossible to calculate [[hypervolume]]s which depend on this orientation. | ||
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| + | The lowest-dimensional immeasurable rotope is the three-dimensional [[triangular torus]]. | ||
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| + | [[Category:Immeasurable rotopes|*]] | ||
Revision as of 20:07, 9 August 2007
An immeasurable rotope is a rotope which has a superscript letter inside a group in its group notation definition.
The effect of this is that the orientation of a non-spherical part of a group in the rotope is undefined, making it impossible to calculate hypervolumes which depend on this orientation.
The lowest-dimensional immeasurable rotope is the three-dimensional triangular torus.
