A Step toward an MLD Classification of Selfsimilar Quasilattices

Progress of Theoretical Physics Pub Date : 2012-10-01 DOI:10.1143/PTP.128.629

K. Niizeki

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引用次数: 1

Abstract

The point inflation rule (PIR) proposed in a previous paper as a method of obtaining a kind of selfsimilar quasilattices (SSQLs) is extended so that it is applicable to all kinds of SSQLs. The result will be an important step toward a complete MLD classification of SSQLs. The PIR is manifested by an affine autonomous set map (AASM) Ψ characterized by a pair {S ,σ } of a star S and an expansive affine transformation σ; S is a subset of the module L supporting the SSQL and σ is an automorphism of L .I t represents a local rule combining an SSQL Q and its inflation σQ; S specifies the range affected by the local rule. The conjugate map Ψ ⊥ operating on the internal space is another AASM characterized by the conjugate pair {S ⊥ ,σ ⊥ }; σ ⊥ is a contractive affine transformation. The window of Q is a fixed set of Ψ ⊥ and has usually a fractal boundary. The double-star AASM in which two disjoint substars of S play different roles is of particular importance. We produce by maps of this type a lot of new SSQLs with the octagonal, decagonal, and dodecagonal point symmetries. SSQLs of nonBravais type and tilings of tiles with fractal boundaries are included in the formalism. Subject Index: 013

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自相似拟格的MLD分类

将前人提出的点膨胀规则(PIR)作为获得一类自相似拟格(ssql)的方法进行了推广，使其适用于所有类型的ssql。该结果将是实现ssql完整的MLD分类的重要一步。PIR表现为一个仿射自治集映射(AASM) Ψ，其特征为恒星S的一对{S，σ}和一个扩展仿射变换σ;S是支持SSQL的模块L的一个子集，σ是L的一个自同构。t表示一个局部规则组合了一个SSQL Q和它的膨胀σQ;S表示受本地规则影响的范围。内空间上的共轭映射Ψ⊥是另一个由共轭对{S⊥，σ⊥}表征的AASM;∑⊥是一个收缩仿射变换。Q的窗口是一个固定的Ψ⊥集合，通常有一个分形边界。其中S的两个不相交的子恒星起不同作用的双星AASM尤为重要。通过这种类型的映射，我们产生了许多具有八角形、十角形和十二角形点对称的新ssql。非bravais型的ssql和具有分形边界的瓷砖的铺贴都包含在形式体系中。主题索引:013

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来源期刊

Progress of Theoretical Physics 物理-物理：综合

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审稿时长

4-8 weeks