Immeasurable rotope (no ontology)

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Latest revision as of 23:19, 4 December 2010

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.

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	The lowest-dimensional immeasurable rotope is the three-dimensional [[triangular torus]].		The lowest-dimensional immeasurable rotope is the three-dimensional [[triangular torus]].

-	[[Category:~~Rotopic properties~~]]	+	[[Category:Rotopes]]