意味 | 共起表現 |
「tilings」の共起表現一覧(1語右で並び替え)
該当件数 : 36件
ertex arrangement as two other simple rhombic | tilings, and the triangular tiling. |
l), composed of two matching planes of square | tilings and cubic holes connecting them. |
These symmetries of overlapping | tilings are not considered triangle groups. |
Substitution | tilings are notably useful as ways of defining aperio |
Formally, the Pinwheel | tilings are the tilings whose tiles are isometric cop |
Chavey lists all those edge-to-edge | tilings by regular polygons which are at most 3-unifo |
There are also | tilings by overlapping triangles, which correspond to |
of faces at every vertex, these polyhedra and | tilings can be shown by alternating two colors so all |
Each family contains up to 8 uniform | tilings, defined by a Wythoff symbol or Coxeter-Dynki |
Other quasiregular | tilings exist on the hyperbolic plane, like the trihe |
There are 3 regular and 8 semiregular | tilings in the plane. |
This operation (for polyhedra and | tilings) is also called expansion by Alicia Boole Sto |
distringuish it from other similar hyperbolic | tilings, like 3-7 kisrhombille. |
Such periodic | tilings may be classified by the number of orbits of |
It is one of three regular | tilings of the plane. |
which pack without overlapping, analogous to | tilings of concave polygons. |
elated as a part of sequence of polyhedra and | tilings of pentagons with face configurations (V3.3.3 |
to a sequence of polyhedra and continue into | tilings of the hyperbolic plane. |
me symmetry group, and thus yields heptagonal | tilings of Hurwitz surfaces. |
Tilings of the plane can also be quasiregular, specif | |
to mathematics, it describes the quaquaversal | tilings of euclidean 3-space defined by Conway-Radin |
For some classes of | tilings on a regular grid in two dimensions, it is po |
There are an infinite number of uniform | tilings on the hyperbolic plane based on the (p q r) |
Tilings or tessellations of the plane. | |
nstruction there are eight hyperbolic uniform | tilings that can be based from the regular heptagonal |
the uniform polyhedra there are eight uniform | tilings that can be based from the regular square til |
the uniform polyhedra there are eight uniform | tilings that can be based from the regular hexagonal |
(The sequence progresses into | tilings the hyperbolic plane to any n.) |
For 2-dimensional | tilings, they can be given by a vertex configuration |
They strongly resemble Penrose | tilings, to which the designs on the Darb-e Imam shri |
The translational rhombic and zig-zag rhombic | tilings, which are topologically equivalent to the sq |
g sequence of uniform truncated polyhedra and | tilings with 3.2n.2n |
pologically part of sequence of polyhedra and | tilings with vertex figure (3.2n.3.2n) and (*n33) ref |
s a part of sequence of regular polyhedra and | tilings with vertex figure (4n). |
a sequence of truncated rhombic polyhedra and | tilings with [n,3] Coxeter group symmetry. |
it relates to the infinite series of 3-color | tilings with the face configurations V3.2n.3.2n, the |
意味 | 共起表現 |
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