12/7/2023 0 Comments Types of tessellationIn the subject of computer graphics, tessellation techniques are often used to manage datasets of polygons and divide them into suitable structures for rendering. This basketweave tiling is topologically identical to the Cairo pentagonal tiling, with one side of each rectangle counted as two edges, divided by a vertex on the two neighboring rectangles. All n-dimensional hypercubic honeycombs with Schlafli symbols, are self-dual. Tilings and honeycombs can also be self-dual. Spiral monohedral tilings include the Voderberg tiling discovered by Hans Voderberg in 1936, whose unit tile is a nonconvex enneagon and the Hirschhorn tiling discovered by Michael Hirschhorn in the 1970s, whose unit tile is an irregular pentagon. They belong to a general class of aperiodic tilings that can be constructed out of self-replicating sets of polygons by using recursion.Ī monohedral tiling is a tessellation in which all tiles are congruent. Penrose tilings using two different polygons are the most famous example of tessellations that create aperiodic patterns. There are regular versus irregular, periodic versus nonperiodic, symmetric versus asymmetric, and fractal tessellations, as well as other classifications. Other types of tessellations exist, depending on types of figures and types of pattern. no tile shares a partial side with any other tile. An edge-to-edge tessellation is even less regular: the only requirement is that adjacent tiles only share full sides, i.e. The arrangement of polygons at every vertex point is identical. A semiregular tessellation uses a variety of regular polygons there are eight of these. Only three regular tessellations exist: those made up of equilateral triangles, squares, or hexagons. Regular and semi-regular tessellationsĪ regular tessellation is a highly symmetric tessellation made up of congruent regular polygons. Such a triangle has the same area as the quadrilateral and can be constructed from it by cutting and pasting. We can divide this by one diagonal, and take one half (a triangle) as fundamental domain. Equivalently, we can construct a parallelogram subtended by a minimal set of translation vectors, starting from a rotational center. As fundamental domain we have the quadrilateral. For an asymmetric quadrilateral this tiling belongs to wallpaper group p2. Tessellations with quadrilateralsĬopies of an arbitrary quadrilateral can form a tessellation with 2-fold rotational centers at the midpoints of all sides, and translational symmetry whose basis vectors are the diagonal of the quadrilateral or, equivalently, one of these and the sum or difference of the two. To produce a coloring which does, as many as seven colors may be needed, as in the picture at right. Note that the coloring guaranteed by the four-color theorem will not in general respect the symmetries of the tessellation. The four color theorem states that for every tessellation of a normal Euclidean plane, with a set of four available colors, each tile can be colored in one color such that no tiles of equal color meet at a curve of positive length. When discussing a tiling that is displayed in colors, to avoid ambiguity one needs to specify whether the colors are part of the tiling or just part of its illustration. (This tiling can be compared to the surface of a torus.) Coloring after tiling, only four colors are needed. If this parallelogram pattern is colored before tiling it over a plane, seven colors are required to ensure each complete parallelogram has a consistent color that is distinct from that of adjacent areas. Of the three regular tilings two are in the p6m wallpaper group and one is in p4m. All seventeen of these groups are represented in the Alhambra palace in Granada, Spain. Tilings with translational symmetry can be categorized by wallpaper groups, of which 17 exist. Other prominent contributors include Shubnikov and Belov (1951) and Heinrich Heesch and Otto Kienzle (1963). Fedorov's work marked the unofficial beginning of the mathematical study of tessellations. Some two hundred years later in 1891, the Russian crystallographer Yevgraf Fyodorov proved that every periodic tiling of the plane features one of seventeen different groups of isometries. In 1619 Johannes Kepler did one of the first documented studies of tessellations when he wrote about the regular and semiregular tessellation, which are coverings of a plane with regular polygons.
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