Gyrobifastigium Knowpia

Elongated tetragonal disphenoid
Elongated tetragonal disphenoid
	<img src="//upload.wikimedia.org/wikipedia/commons/thumb/f/f5/Dual_gyrobifastigium.png/220px-Dual_gyrobifastigium.png" decoding="async" width="220" height="220" class="mw-file-element" data-file-width="1200" data-file-height="1200">
Type	Johnson dual
Faces	8 triangles; 4 parallelograms
Edges	14
Vertices	8
Symmetry group	D2d
Dual polyhedron	Gyrobifastigium
Net
	<img src="//upload.wikimedia.org/wikipedia/commons/thumb/6/65/Dual-gyrobifastigium-net.png/280px-Dual-gyrobifastigium-net.png" decoding="async" width="280" height="203" class="mw-file-element" data-file-width="2005" data-file-height="1456">

Gyrobifastigium
Gyrobifastigium
Type	Johnson; J25 – J26 – J27
Faces	4 triangles; 4 squares
Edges	14
Vertices	8
Vertex configuration	4(3.42); 4(3.4.3.4)
Symmetry group	D2d
Dual polyhedron	Elongated tetragonal disphenoid
Properties	convex, honeycomb
Net

In geometry, the gyrobifastigium is the 26th Johnson solid ( $J 26$ ). It can be constructed by joining two face-regular triangular prisms along corresponding square faces, giving a quarter-turn to one prism.^[1] It is the only Johnson solid that can tile three-dimensional space.^[2]^[3]

It is also the vertex figure of the nonuniform $p - q$ duoantiprism (if $p$ and $q$ are greater than 2). Despite the fact that $p, q = 3$ would yield a geometrically identical equivalent to the Johnson solid, it lacks a circumscribed sphere that touches all vertices, except for the case $p = 5,$ $q = .mw-parser-output .sfrac{white-space:nowrap}.mw-parser-output .sfrac.tion,.mw-parser-output .sfrac .tion{display:inline-block;vertical-align:-0.5em;font-size:85%;text-align:center}.mw-parser-output .sfrac .num{display:block;line-height:1em;margin:0.0em 0.1em;border-bottom:1px solid}.mw-parser-output .sfrac .den{display:block;line-height:1em;margin:0.1em 0.1em}.mw-parser-output .sr-only{border:0;clip:rect(0,0,0,0);clip-path:polygon(0px 0px,0px 0px,0px 0px);height:1px;margin:-1px;overflow:hidden;padding:0;position:absolute;width:1px}5/3,$ which represents a uniform great duoantiprism.

Its dual, the elongated tetragonal disphenoid, can be found as cells of the duals of the $p - q$ duoantiprisms.

History and name edit

A Johnson solid is one of 92 strictly convex polyhedra that is composed of regular polygon faces but are not uniform polyhedra (that is, they are not Platonic solids, Archimedean solids, prisms, or antiprisms). They were named by Norman Johnson, who first listed these polyhedra in 1966.^[4]

The name of the gyrobifastigium comes from the Latin fastigium, meaning a sloping roof.^[5] In the standard naming convention of the Johnson solids, bi- means two solids connected at their bases, and gyro- means the two halves are twisted with respect to each other.

The gyrobifastigium's place in the list of Johnson solids, immediately before the bicupolas, is explained by viewing it as a digonal gyrobicupola. Just as the other regular cupolas have an alternating sequence of squares and triangles surrounding a single polygon at the top (triangle, square or pentagon), each half of the gyrobifastigium consists of just alternating squares and triangles, connected at the top only by a ridge.

Honeycomb edit

The gyrated triangular prismatic honeycomb can be constructed by packing together large numbers of identical gyrobifastigiums. The gyrobifastigium is one of five convex polyhedra with regular faces capable of space-filling (the others being the cube, truncated octahedron, triangular prism, and hexagonal prism) and it is the only Johnson solid capable of doing so.^[2]^[3]

Cartesian coordinates edit

Cartesian coordinates for the gyrobifastigium with regular faces and unit edge lengths may easily be derived from the formula of the height of unit edge length

h={\frac {\sqrt {3}}{2}},

^[6]

as follows:

\left(\pm {\frac {1}{2}},\pm {\frac {1}{2}},0\right),\left(0,\pm {\frac {1}{2}},{\frac {{\sqrt {3}}+1}{2}}\right),\left(\pm {\frac {1}{2}},0,-{\frac {{\sqrt {3}}+1}{2}}\right).

To calculate formulae for the surface area and volume of a gyrobifastigium with regular faces and with edge length a, one may simply adapt the corresponding formulae for the triangular prism:^[7]

A=\left(4+{\sqrt {3}}\right)a^{2}\approx 5.73205a^{2},

V=\left({\frac {\sqrt {3}}{2}}\right)a^{3}\approx 0.86603a^{3}.

Topologically equivalent polyhedra edit

The gyrobifastigium topology can be realized by subdividing the faces of a tetragonal disphenoid.

Schmitt–Conway–Danzer biprism edit

Schmitt–Conway–Danzer biprism

The Schmitt–Conway–Danzer biprism (also called a SCD prototile^[8]) is a polyhedron topologically equivalent to the gyrobifastigium, but with parallelogram and irregular triangle faces instead of squares and equilateral triangles. Like the gyrobifastigium, it can fill space, but only aperiodically or with a screw symmetry, not with a full three-dimensional group of symmetries. Thus, it provides a partial solution to the three-dimensional einstein problem.^[9]^[10]

Dual edit

The dual polyhedron of the gyrobifastigium has 8 faces: 4 isosceles triangles, corresponding to the valence-3 vertices of the gyrobifastigium, and 4 parallelograms corresponding to the valence-4 equatorial vertices.

References edit

^ Darling, David (2004), The Universal Book of Mathematics: From Abracadabra to Zeno's Paradoxes, John Wiley & Sons, p. 169, ISBN 9780471667001.
^ ^a ^b Alam, S. M. Nazrul; Haas, Zygmunt J. (2006), "Coverage and Connectivity in Three-dimensional Networks", Proceedings of the 12th Annual International Conference on Mobile Computing and Networking (MobiCom '06), New York, NY, USA: ACM, pp. 346–357, arXiv:cs/0609069, doi:10.1145/1161089.1161128, ISBN 1-59593-286-0, S2CID 3205780.
^ ^a ^b Kepler, Johannes (2010), The Six-Cornered Snowflake, Paul Dry Books, Footnote 18, p. 146, ISBN 9781589882850.
^ Johnson, Norman W. (1966), "Convex polyhedra with regular faces", Canadian Journal of Mathematics, 18: 169–200, doi:10.4153/cjm-1966-021-8, MR 0185507, Zbl 0132.14603.
^ Rich, Anthony (1875), "Fastigium", in Smith, William (ed.), A Dictionary of Greek and Roman Antiquities, London: John Murray, pp. 523–524.
^ Weisstein, Eric W. "Equilateral Triangle". MathWorld.
^ Weisstein, Eric W. "Triangular Prism". MathWorld.
^ Forcing Nonperiodicity With a Single Tile Joshua E. S. Socolar and Joan M. Taylor, 2011
^ Senechal, Marjorie (1996), "7.2 The SCD (Schmitt–Conway–Danzer) tile", Quasicrystals and Geometry, Cambridge University Press, pp. 209–213, ISBN 9780521575416.
^ Tiling Space with a Schmitt-Conway Biprism wolfram demonstrations

External links edit

Weisstein, Eric W., "Gyrobifastigium" ("Johnson solid") at MathWorld.

[1] Darling, David (2004), The Universal Book of Mathematics: From Abracadabra to Zeno's Paradoxes, John Wiley & Sons, p. 169, ISBN 9780471667001.

[ah06-2] Alam, S. M. Nazrul; Haas, Zygmunt J. (2006), "Coverage and Connectivity in Three-dimensional Networks", Proceedings of the 12th Annual International Conference on Mobile Computing and Networking (MobiCom '06), New York, NY, USA: ACM, pp. 346–357, arXiv:cs/0609069, doi:10.1145/1161089.1161128, ISBN 1-59593-286-0, S2CID 3205780.

[kepler-3] Kepler, Johannes (2010), The Six-Cornered Snowflake, Paul Dry Books, Footnote 18, p. 146, ISBN 9781589882850.

[4] Johnson, Norman W. (1966), "Convex polyhedra with regular faces", Canadian Journal of Mathematics, 18: 169–200, doi:10.4153/cjm-1966-021-8, MR 0185507, Zbl 0132.14603.

[5] Rich, Anthony (1875), "Fastigium", in Smith, William (ed.), A Dictionary of Greek and Roman Antiquities, London: John Murray, pp. 523–524.

[6] Weisstein, Eric W. "Equilateral Triangle". MathWorld.

[7] Weisstein, Eric W. "Triangular Prism". MathWorld.

[8] Forcing Nonperiodicity With a Single Tile Joshua E. S. Socolar and Joan M. Taylor, 2011

[9] Senechal, Marjorie (1996), "7.2 The SCD (Schmitt–Conway–Danzer) tile", Quasicrystals and Geometry, Cambridge University Press, pp. 209–213, ISBN 9780521575416.

[10] Tiling Space with a Schmitt-Conway Biprism wolfram demonstrations

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Summary