Hex Rosa

Year: 2016 Authors: Markus Rissanen

Core claim

Hex Rosa constructs nonperiodic rhombic tilings with one global n-fold center and infinitely many local n-fold rose patches for all n ≥ 3.

Topics

rhombic tilings, rotational symmetry, local patches, hexagonal modules, nonperiodic patterns

Domains

tiling theory, geometry, rotational symmetry, polygon angles, quasiperiodicity, pattern design, visual geometry, mathematical art

Methods

delta hexagon construction, vertex-based rose placement, case analysis by n parity, tiling enumeration

Media

rhombuses, hexagonal modules, diagrammatic figures, tiling patches

Source status

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