Rectification (geometry)
In Euclidean geometry, rectification, also known as critical truncation or complete-truncation, is the process of truncating a polytope by marking the midpoints of all its edges, and cutting off its vertices at those points.[1] The resulting polytope will be bounded by vertex figure facets and the rectified facets of the original polytope.
A rectification operator is sometimes denoted by the letter r with a Schläfli symbol. For example, r{4,3} is the rectified cube, also called a cuboctahedron, and also represented as . And a rectified cuboctahedron rr{4,3} is a rhombicuboctahedron, and also represented as .
Conway polyhedron notation uses a for ambo as this operator. In graph theory this operation creates a medial graph.
The rectification of any regular self-dual polyhedron or tiling will result in another regular polyhedron or tiling with a tiling order of 4, for example the tetrahedron {3,3} becoming an octahedron {3,4}. As a special case, a square tiling {4,4} will turn into another square tiling {4,4} under a rectification operation.
Example of rectification as a final truncation to an edge edit
Rectification is the final point of a truncation process. For example, on a cube this sequence shows four steps of a continuum of truncations between the regular and rectified form:
Higher degree rectifications edit
Higher degree rectification can be performed on higher-dimensional regular polytopes. The highest degree of rectification creates the dual polytope. A rectification truncates edges to points. A birectification truncates faces to points. A trirectification truncates cells to points, and so on.
Example of birectification as a final truncation to a face edit
This sequence shows a birectified cube as the final sequence from a cube to the dual where the original faces are truncated down to a single point:
In polygons edit
The dual of a polygon is the same as its rectified form. New vertices are placed at the center of the edges of the original polygon.
In polyhedra and plane tilings edit
Each platonic solid and its dual have the same rectified polyhedron. (This is not true of polytopes in higher dimensions.)
The rectified polyhedron turns out to be expressible as the intersection of the original platonic solid with an appropriately scaled concentric version of its dual. For this reason, its name is a combination of the names of the original and the dual:
- The tetrahedron is its own dual, and its rectification is the tetratetrahedron, better known as the octahedron.
- The octahedron and the cube are each other's dual, and their rectification is the cuboctahedron.
- The icosahedron and the dodecahedron are duals, and their rectification is the icosidodecahedron.
Examples
| Family | Parent | Rectification | Dual |
|---|---|---|---|
| [p,q] | |||
| [3,3] | Tetrahedron | Octahedron | Tetrahedron |
| [4,3] | Cube | Cuboctahedron | Octahedron |
| [5,3] | Dodecahedron | Icosidodecahedron | Icosahedron |
| [6,3] | Hexagonal tiling | Trihexagonal tiling | Triangular tiling |
| [7,3] | Order-3 heptagonal tiling | Triheptagonal tiling | Order-7 triangular tiling |
| [4,4] | Square tiling | Square tiling | Square tiling |
| [5,4] | Order-4 pentagonal tiling | Tetrapentagonal tiling | Order-5 square tiling |
In nonregular polyhedra edit
If a polyhedron is not regular, the edge midpoints surrounding a vertex may not be coplanar. However, a form of rectification is still possible in this case: every polyhedron has a polyhedral graph as its 1-skeleton, and from that graph one may form the medial graph by placing a vertex at each edge midpoint of the original graph, and connecting two of these new vertices by an edge whenever they belong to consecutive edges along a common face. The resulting medial graph remains polyhedral, so by Steinitz's theorem it can be represented as a polyhedron.
The Conway polyhedron notation equivalent to rectification is ambo, represented by a. Applying twice aa, (rectifying a rectification) is Conway's expand operation, e, which is the same as Johnson's cantellation operation, t0,2 generated from regular polyhedral and tilings.
In 4-polytopes and 3D honeycomb tessellations edit
Each Convex regular 4-polytope has a rectified form as a uniform 4-polytope.
A regular 4-polytope {p,q,r} has cells {p,q}. Its rectification will have two cell types, a rectified {p,q} polyhedron left from the original cells and {q,r} polyhedron as new cells formed by each truncated vertex.
A rectified {p,q,r} is not the same as a rectified {r,q,p}, however. A further truncation, called bitruncation, is symmetric between a 4-polytope and its dual. See Uniform 4-polytope#Geometric derivations.
Examples
| Family | Parent | Rectification | Birectification (Dual rectification) | Trirectification (Dual) |
|---|---|---|---|---|
| [p,q,r] | {p,q,r} | r{p,q,r} | 2r{p,q,r} | 3r{p,q,r} |
| [3,3,3] | 5-cell | rectified 5-cell | rectified 5-cell | 5-cell |
| [4,3,3] | tesseract | rectified tesseract | Rectified 16-cell (24-cell) | 16-cell |
| [3,4,3] | 24-cell | rectified 24-cell | rectified 24-cell | 24-cell |
| [5,3,3] | 120-cell | rectified 120-cell | rectified 600-cell | 600-cell |
| [4,3,4] | Cubic honeycomb | Rectified cubic honeycomb | Rectified cubic honeycomb | Cubic honeycomb |
| [5,3,4] | Order-4 dodecahedral | Rectified order-4 dodecahedral | Rectified order-5 cubic | Order-5 cubic |
Degrees of rectification edit
A first rectification truncates edges down to points. If a polytope is regular, this form is represented by an extended Schläfli symbol notation t1{p,q,...} or r{p,q,...}.
A second rectification, or birectification, truncates faces down to points. If regular it has notation t2{p,q,...} or 2r{p,q,...}. For polyhedra, a birectification creates a dual polyhedron.
Higher degree rectifications can be constructed for higher dimensional polytopes. In general an n-rectification truncates n-faces to points.
If an n-polytope is (n-1)-rectified, its facets are reduced to points and the polytope becomes its dual.
Notations and facets edit
There are different equivalent notations for each degree of rectification. These tables show the names by dimension and the two type of facets for each.
Regular polygons edit
Facets are edges, represented as {}.
| name {p} | Coxeter diagram | t-notation Schläfli symbol | Vertical Schläfli symbol | ||
|---|---|---|---|---|---|
| Name | Facet-1 | Facet-2 | |||
| Parent | t0{p} | {p} | {} | ||
| Rectified | t1{p} | {p} | {} | ||
Regular polyhedra and tilings edit
Facets are regular polygons.
| name {p,q} | Coxeter diagram | t-notation Schläfli symbol | Vertical Schläfli symbol | ||
|---|---|---|---|---|---|
| Name | Facet-1 | Facet-2 | |||
| Parent | = | t0{p,q} | {p,q} | {p} | |
| Rectified | = | t1{p,q} | r{p,q} = | {p} | {q} |
| Birectified | = | t2{p,q} | {q,p} | {q} | |
Regular Uniform 4-polytopes and honeycombs edit
Facets are regular or rectified polyhedra.
| name {p,q,r} | Coxeter diagram | t-notation Schläfli symbol | Extended Schläfli symbol | ||
|---|---|---|---|---|---|
| Name | Facet-1 | Facet-2 | |||
| Parent | t0{p,q,r} | {p,q,r} | {p,q} | ||
| Rectified | t1{p,q,r} | = r{p,q,r} | = r{p,q} | {q,r} | |
| Birectified (Dual rectified) | t2{p,q,r} | = r{r,q,p} | {q,r} | = r{q,r} | |
| Trirectified (Dual) | t3{p,q,r} | {r,q,p} | {r,q} | ||
Regular 5-polytopes and 4-space honeycombs edit
Facets are regular or rectified 4-polytopes.
| name {p,q,r,s} | Coxeter diagram | t-notation Schläfli symbol | Extended Schläfli symbol | ||
|---|---|---|---|---|---|
| Name | Facet-1 | Facet-2 | |||
| Parent | t0{p,q,r,s} | {p,q,r,s} | {p,q,r} | ||
| Rectified | t1{p,q,r,s} | = r{p,q,r,s} | = r{p,q,r} | {q,r,s} | |
| Birectified (Birectified dual) | t2{p,q,r,s} | = 2r{p,q,r,s} | = r{r,q,p} | = r{q,r,s} | |
| Trirectified (Rectified dual) | t3{p,q,r,s} | = r{s,r,q,p} | {r,q,p} | = r{s,r,q} | |
| Quadrirectified (Dual) | t4{p,q,r,s} | {s,r,q,p} | {s,r,q} | ||
See also edit
References edit
- ^ Weisstein, Eric W. "Rectification". MathWorld.
- Coxeter, H.S.M. Regular Polytopes, (3rd edition, 1973), Dover edition, ISBN 0-486-61480-8 (pp. 145–154 Chapter 8: Truncation)
- Norman Johnson Uniform Polytopes, Manuscript (1991)
- N.W. Johnson: The Theory of Uniform Polytopes and Honeycombs, Ph.D. Dissertation, University of Toronto, 1966
- John H. Conway, Heidi Burgiel, Chaim Goodman-Strauss, The Symmetries of Things 2008, ISBN 978-1-56881-220-5 (Chapter 26)
External links edit
- Olshevsky, George. . Glossary for Hyperspace. Archived from the original on 4 February 2007.
| Seed | Truncation | Rectification | Bitruncation | Dual | Expansion | Omnitruncation | Alternations | ||
|---|---|---|---|---|---|---|---|---|---|
| t0{p,q} {p,q} | t01{p,q} t{p,q} | t1{p,q} r{p,q} | t12{p,q} 2t{p,q} | t2{p,q} 2r{p,q} | t02{p,q} rr{p,q} | t012{p,q} tr{p,q} | ht0{p,q} h{q,p} | ht12{p,q} s{q,p} | ht012{p,q} sr{p,q} |