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Omnitruncation : ウィキペディア英語版 | Omnitruncation In geometry, an omnitruncation is an operation applied to a regular polytope (or honeycomb) in a Wythoff construction that creates a maximum number of facets. It is represented in a Coxeter–Dynkin diagram with all nodes ringed. It is a ''shortcut'' term which has a different meaning in progressively-higher-dimensional polytopes: * Uniform polytope#Truncation_operators * * For regular polygons: An ordinary truncation, t0,1 = t = . * * * Coxeter-Dynkin diagram * * For uniform polyhedra (3-polytopes): A cantitruncation (great rhombation), t0,1,2 = tr. (Application of both cantellation and truncation operations) * * * Coxeter-Dynkin diagram: * * For Uniform 4-polytopes: A runcicantitruncation (great prismation), t0,1,2,3. (Application of runcination, cantellation, and truncation operations) * * * Coxeter-Dynkin diagram: , , * * For uniform polytera (5-polytopes): A steriruncicantitruncation (great cellation), t0,1,2,3,4. (Application of sterication, runcination, cantellation, and truncation operations) * * * Coxeter-Dynkin diagram: , , * * For uniform n-polytopes: t0,1,...,n-1. == See also ==
* Expansion (geometry) * Omnitruncated polyhedron
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