geometrins

Geometrins are a class of two-dimensional geometric figures defined by an iterative substitution rule applied to a starting polygonal motif. Each geometrin type specifies a fixed replacement pattern that is applied to every edge and vertex in successive generations. The result is a closed region whose boundary is a concatenation of segments from the motif and whose interior remains a single connected set. Geometrins are studied within substitution tilings and fractal geometry and can display self-similarity and varying boundary complexity depending on the rule.

Construction and classification: A geometrin is generated by a formal grammar or L-system that prescribes how

Examples and uses: Commonly studied geometrins include those defined by simple replacement rules that yield triangular

See also: substitution tiling, fractal geometry, self-similarity, aperiodic tiling.