Deltahedron

A deltahedron is a polyhedron whose faces are all equilateral triangles. The deltahedron is named by Martyn Cundy, after the Greek capital letter delta resembling a triangular shape Δ.^[1] The deltahedron can be categorized by the property of convexity. There are eight convex deltahedra, which can be used in the applications of chemistry as in the polyhedral skeletal electron pair theory and chemical compounds. Omitting the convex property leaves the results in infinitely many deltahedrons alongside its subclasses recognition.

Convex deltahedron

Some examples of convex deltahedra are the regular icosahedron and triaugmented triangular prism.

Of the eight convex deltahedra, three are Platonic solids and five are Johnson solids. They are:^[2]

regular tetrahedron, a pyramid with four equilateral triangles, one of which can be considered the base.
triangular bipyramid, regular octahedron, and pentagonal bipyramid, a bipyramid with six, eight, and ten equilateral triangles, respectively. They are constructed by identical pyramids base-to-base.
gyroelongated square bipyramid and regular icosahedron are constructed by attaching two pyramids onto a square antiprism or pentagonal prism, respectively, such that they have sixteen and twenty triangular faces.
triaugmented triangular prism, constructed by attaching three square pyramids onto the square face of a triangular prism, such that it has fourteen triangular faces.
snub disphenoid, with twelve triangular faces, constructed by involving two regular hexagons in the following order: these hexagons may form a bipyramid in degeneracy, separating them into two parts along a coinciding diagonal, pressing inward on the end of diagonal, rotating one of them in 90°, and rejoining them together.

The number of possible convex deltahedrons was given by Rausenberger (1915), using the fact that multiplying the number of faces by three results in each edge is shared by two faces, by which substituting this to Euler's polyhedron formula. In addition, it may show that a polyhedron with eighteen equilateral triangles is mathematically possible, although it is impossible to construct it geometrically. Rausenberger named these solids as the convex pseudoregular polyhedra.^[3]

Summarizing the examples above, the deltahedra can be conclusively defined as the class of polyhedra whose faces are equilateral triangles.^[4] A polyhedron is said to be convex if a line between any two of its vertices lies either within its interior or on its boundary, and additionally, if no two faces are coplanar (lying in the same) and no two edges are colinear (segments of the same line).^[5] Another definition by Bernal (1964) is similar to the previous one, in which he was interested in the shapes of holes left in irregular close-packed arrangements of spheres. It is stated as a convex polyhedron with equilateral triangular faces that can be formed by the centers of a collection of congruent spheres, whose tangencies represent polyhedron edges, and such that there is no room to pack another sphere inside the cage created by this system of spheres. Because of this restriction, some polyhedrons may not be included as a deltahedron: the triangular bipyramid (as forming two tetrahedral holes rather than a single hole), pentagonal bipyramid (because the spheres for its apexes interpenetrate, so it cannot occur in sphere packings), and regular icosahedron (because it has interior room for another sphere).^[6]

Most convex deltahedrons can be found in the study of chemistry. For example, they are categorized as the closo polyhedron in the study of Polyhedral skeletal electron pair theory.^[7] Other applications of deltahedrons—excluding the regular icosahedron—are the visualization of an atom cluster surrounding a central atom as a polyhedron in the study of chemical compounds: regular tetrahedron represents the tetrahedral molecular geometry, triangular bipyramid represents trigonal bipyramidal molecular geometry, regular octahedron represents the octahedral molecular geometry, pentagonal bipyramid represents the pentagonal bipyramidal molecular geometry, gyroelongated square bipyramid represents the bicapped square antiprismatic molecular geometry, triaugmented triangular prism represents the tricapped trigonal prismatic molecular geometry, and snub disphenoid represents the dodecahedral molecular geometry.^[8]

Non-convex deltahedron

A non-convex deltahedron is a deltahedron that does not possess convexity, meaning it has neither coplanar faces nor collinear edges. There are infinitely many non-convex deltahedrons.^[9] Some examples are stella octangula, the third stellation of a regular icosahedron, and Boerdijk–Coxeter helix.^[10]

There are subclasses of non-convex deltahedrons. Cundy (1952) shows that they may be discovered by finding the number of varying vertex's types. A set of vertices is considered the same type as long as there are subgroups of the polyhedron's same group transitive on the set. Cundy shows that the great icosahedron is the only non-convex deltahedron with a single type of vertex. There are seventeen non-convex deltahedrons with two types of vertex, and soon the other eleven deltahedrons were later added by Olshevsky,^[11] Other subclasses are the isohedral deltahedron that was later discovered by both McNeill and Shephard (2000),^[12] and the spiral deltahedron constructed by the strips of equilateral triangles was discovered by Trigg (1978).^[13]

References

Footnotes

^
- Cundy (1952)
- Cromwell (1997), p. 75
- Trigg (1978)
^
- Trigg (1978)
- Litchenberg (1988), p. 263
- Freudenthal & van der Waerden (1947)
^
- Rausenberger (1915)
- Litchenberg (1988), p. 263
^
- Cundy (1952)
- Cromwell (1997), p. 75
- Trigg (1978)
^
- Litchenberg (1988), p. 262
- Boissonnat & Yvinec (1989)
^ Bernal (1964).
^ Kharas & Dahl (1988), p. 8.
^
- Burdett, Hoffmann & Fay (1978)
- Gillespie & Hargittai (2013), p. 152
- Kepert (1982), p. 7–21
- Petrucci, Harwood & Herring (2002), p. 413–414, See table 11.1.
- Remhov & Černý (2021), p. 270
^
- Trigg (1978)
- Eppstein (2021)
^
- Pedersen & Hyde (2018)
- Weils (1991), p. 78
^
- Cundy (1952)
- Olshevsky
- Tsuruta et al. (2015)
^
- McNeill
- Shephard (2000)
- Tsuruta et al. (2015)
^
- Trigg (1978)
- Tsuruta et al. (2015)

Works cited

Bernal, J. D. (1964), "The Bakerian Lecture, 1962. The Structure of Liquids", Proceedings of the Royal Society of London, Series A, Mathematical and Physical Sciences, 280 (1382): 299–322, Bibcode:1964RSPSA.280..299B, doi:10.1098/rspa.1964.0147, JSTOR 2415872, S2CID 178710030.
Boissonnat, J. D.; Yvinec, M. (June 1989), "Probing a scene of non convex polyhedra", Proceedings of the fifth annual symposium on Computational geometry: 237–246, doi:10.1145/73833.73860.
Burdett, Jeremy K.; Hoffmann, Roald; Fay, Robert C. (1978), "Eight-Coordination", Inorganic Chemistry, 17 (9): 2553–2568, doi:10.1021/ic50187a041.
Cromwell, Peter R. (1997), Polyhedra, Cambridge University Press.
Cundy, H. Martyn (1952), "Deltahedra", Mathematical Gazette, 36: 263–266, doi:10.2307/3608204, JSTOR 3608204.
———; Rollett, A. (1989), "3.11. Deltahedra", Mathematical Models (3rd ed.), Stradbroke, England: Tarquin Pub., pp. 142–144.
Eppstein, D. (2021), "On Polyhedral Realization with Isosceles Triangles", Graphs and Combinatorics, 37, Springer: 1247–1269, doi:10.1007/s00373-021-02314-9
Foulds, L. R.; Robinson, D. F. (1979), "Construction properties of combinatorial deltahedra", Discrete Applied Mathematics, 1 (1–2): 75–87, doi:10.1016/0166-218X(79)90015-5.
Freudenthal, H.; van der Waerden, B. L. (1947), "On an assertion of Euclid", Simon Stevin, 25: 115–121, MR 0021687.
Gardner, Martin (1992), Fractal Music, Hypercards, and More: Mathematical Recreations from Scientific American, New York: W. H. Freeman, pp. 40, 53, and 58–60.
Gillespie, Ronald J.; Hargittai, István (2013), The VSEPR Model of Molecular Geometry, Dover Publications, ISBN 978-0-486-48615-4.
Kepert, David L. (1982), "Polyhedra", Inorganic Chemistry Concepts, vol. 6, Springer, doi:10.1007/978-3-642-68046-5_2, ISBN 978-3-642-68048-9.
Kharas, K. C. C.; Dahl, L. F. (1988), "Ligand-Stabilized Metal Clusters: Structure, Bonding, Fluxionarity, and the Metallic State", in Prigogine, I.; Rice, S. A. (eds.), Evolution of Size Effects in Chemical Dynamics Part 2: Advances in Chemical Physics Volume LXX, John Wiley & Sons, p. 8.
Litchenberg, D. R. (1988), "Pyramids, Prisms, Antiprisms, and Deltahedra", The Mathematics Teacher, 81 (4): 261–265, JSTOR 27965792
McNeill, J., Isohedral Deltahedra
Olshevsky, George, Breaking Cundy's Deltahedra Record (PDF)
Pedersen, M. C.; Hyde, S. T. (2018), "Polyhedra and packings from hyperbolic honeycombs", Proceedings of the National Academy of Sciences, 115 (27): 6905–6910, doi:10.1073/pnas.1720307115, PMC 6142264
Petrucci, R. H.; Harwood, W. S.; Herring, F. G. (2002), General Chemistry: Principles and Modern Applications (8th ed.), Prentice-Hall, ISBN 978-0-13-014329-7
Pugh, Anthony (1976), Polyhedra: A visual approach, California: University of California Press Berkeley, pp. 35–36, ISBN 0-520-03056-7.
Rausenberger, O. (1915), "Konvexe pseudoreguläre Polyeder", Zeitschrift für mathematischen und naturwissenschaftlichen Unterricht, 46: 135–142.
Remhov, Arndt; Černý, Radovan (2021), "Hydroborate as novel solid-state electrolytes", in Schorr, Susan; Weidenthaler, Claudia (eds.), Crystallography in Materials Science: From Structure-Property Relationships to Engineering, de Gruyter, ISBN 978-3-11-067485-9.
Shephard, G. C. (2000), "Isohedral Deltahedra", Periodica Mathematica Hungarica, 39: 86–100, doi:10.1023/A:1004838806529.
Trigg, Charles W. (1978), "An Infinite Class of Deltahedra", Mathematics Magazine, 51 (1): 55–57, doi:10.2307/2689647, JSTOR 2689647.
Tsuruta, Naoya; Mitani, Jun; Kanamori, Yoshihiro; Fukui, Yukio (2015), "Random Realization of Polyhedral Graphs as Deltahedra" (PDF), Journal for Geometry and Graphics, 19 (2): 227–236.
Weils, David (1991), The Penguin Dictionary of Curious and Interesting Geometry, Penguin Books, ISBN 9780140118131.

External links

The Cundy Deltahedra or Biform Deltahedra
Weisstein, Eric W., "Deltahedron", MathWorld