Spatial chaos of Wang tiles with two symbols

Abstract

This investigation completely classifies the spatial chaos problem in plane edge coloring (Wang tiles) with two symbols. For a set of Wang tiles B, spatial chaos occurs when the spatial entropy h(B) is positive. B is called a minimal cycle generator if P(B)≠ and P(B')= whenever B'⊂neqq B, where P(B) is the set of all periodic patterns on Z2 generated by B. Given a set of Wang tiles B, write B=C1 C2 ·s Ck N, where Cj, 1≤ j≤ k, are minimal cycle generators and B contains no minimal cycle generator except those contained in C1 C2 ·s Ck. Then, the positivity of spatial entropy h(B) is completely determined by C1 C2 ·s Ck. Furthermore, there are 39 equivalent classes of marginal positive-entropy (MPE) sets of Wang tiles and 18 equivalent classes of saturated zero-entropy (SZE) sets of Wang tiles. For a set of Wang tiles B, h(B) is positive if and only if B contains an MPE set, and h(B) is zero if and only if B is a subset of an SZE set.