Great duoantiprism
Type Uniform polychoron
Schläfli symbols s{5}s{5/3}
{5}⊗{5/3}
h{10}s{5/3}
s{5}h{10/3}
h{10}h{10/3}
Coxeter diagrams


Cells 50 tetrahedra
10 pentagonal antiprisms
10 pentagrammic crossed-antiprisms
Faces 200 triangles
10 pentagons
10 pentagrams
Edges 200
Vertices 50
Vertex figure
star-gyrobifastigium
Symmetry group [5,2,5]+, order 50
[(5,2)+,10], order 100
[10,2+,10], order 200
Properties Vertex-uniform

Net (overlapping in space)

In geometry, the great duoantiprism is the only uniform star-duoantiprism solution p = 5, q = 5/3, in 4-dimensional geometry. It has Schläfli symbol {5}⊗{5/3}, s{5}s{5/3} or ht0,1,2,3{5,2,5/3}, Coxeter diagram , constructed from 10 pentagonal antiprisms, 10 pentagrammic crossed-antiprisms, and 50 tetrahedra.

Its vertices are a subset of those of the small stellated 120-cell.

Construction

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The great duoantiprism can be constructed from a nonuniform variant of the 10-10/3 duoprism (a duoprism of a decagon and a decagram) where the decagram's edge length is around 1.618 (golden ratio) times the edge length of the decagon via an alternation process. The decagonal prisms alternate into pentagonal antiprisms, the decagrammic prisms alternate into pentagrammic crossed-antiprisms with new regular tetrahedra created at the deleted vertices. This is the only uniform solution for the p-q duoantiprism aside from the regular 16-cell (as a 2-2 duoantiprism).

Images

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stereographic projection, centered on one pentagrammic crossed-antiprism
 
Orthogonal projection, with vertices colored by overlaps, red, orange, yellow, green have 1, 2, 3,4 multiplicity.

Other names

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  • Great duoantiprism (gudap) Jonathan Bowers [1][2]

References

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  • Regular Polytopes, H. S. M. Coxeter, Dover Publications, Inc., 1973, New York, p. 124.
  • Norman Johnson Uniform Polytopes, Manuscript (1991)
    • N.W. Johnson: The Theory of Uniform Polytopes and Honeycombs, Ph.D. Dissertation, University of Toronto, 1966
  • Klitzing, Richard. "4D uniform polytopes (polychora) s5/3s2s5s - gudap".