User:Tomruen/Generalized dual method

In geometry, Generalized dual method (also de Bruijn's multigrid method) is a way of constructing aperiodic rhombic tilings using dual lines in 2D. Pairwise intersecting lines in the dual network define the locations of rhombic tiles. Triple intersections produce convex hexagonal tiles, etc. Odd-sided tiles exist centered on odd number of line segments meeting at a point in the dual network.

The method also can be applies to 3D and higher dimensions.