Chaim Goodman-Strauss scite author profile

A substitution tiling is a certain globally de ned hierarchical structure in a geometric space; we show that for any substitution tiling in E n , n 1, subject to relatively mild conditions, one can construct local rules that force the desired global structure to emerge. As an immediate corollary, in nite collections of forced aperiodic tilings are constructed. On the left in gure 1, L-shaped tiles are repeatedly in ated and subdivided". We de ne our terms more precisely in Section 1. As this process is iterated, larger and larger regions of the plane are tiled with L-tiles hierarchically

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Strongly aperiodic subshifts of finite type on hyperbolic groups

Cohen¹,

Goodman-Strauss²,

Rieck³

2021

Ergod. Th. Dynam. Sys.

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A Small Aperiodic Set of Planar Tiles

Goodman-Strauss

1999

European Journal of Combinatorics

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A strongly aperiodic set of tiles in the hyperbolic plane

Goodman-Strauss

2004

Invent. math.

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