Nishant Chandgotia, Brian Marcus, Jacob Richey, Chengyu Wu
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引用次数: 0
摘要
给定一个有限词 $w$,Guibas 和 Odlyzko (J. Combin. Theory Ser. A, 30,1981, 183-208) 发现,记录了 $w$ 的自重叠集合的 $w$ 的自相关多项式 $\phi_w(t)$,明确地决定了每个 $n$ 的长度为 $n$ 的词中避开 $w$ 的词的数目 $|B_n(w)|$。我们从符号动力学的角度来考虑这个问题及相关问题,重点是 $X_{\{w\}}$,即所有避开 $w$ 的双无限序列的空间。我们首先总结并阐述了 (J. Combin. Theory Ser. A, 30, 1981,183-208)和其他工作,以证明序列 $|B_n(w)|$ 等价于 $X_{\{w\}}$ 的几个不变式。然后,我们给出了$X_{\{w\}}$的有限状态标注图表示$L_w$,并证明$w$可以从未标明版本的$L_w$的图同构类中得到。利用$L_w$,我们应用概率论和佩伦-弗罗贝尼斯理论的思想,得到了比较不同$w$下$X_{\{w\}}$特征的结果。接下来,我们给出了对直到共轭的空间 $X_{\{w\}$ 的分类问题的部分结果。最后,我们将部分结果扩展到避免给定有限模式的多维阵列空间。
Shifts of Finite Type Obtained by Forbidding a Single Pattern
Given a finite word $w$, Guibas and Odlyzko (J. Combin. Theory Ser. A, 30,
1981, 183-208) showed that the autocorrelation polynomial $\phi_w(t)$ of $w$,
which records the set of self-overlaps of $w$, explicitly determines for each
$n$, the number $|B_n(w)|$ of words of length $n$ that avoid $w$. We consider
this and related problems from the viewpoint of symbolic dynamics, focusing on
the setting of $X_{\{w\}}$, the space of all bi-infinite sequences that avoid
$w$. We first summarize and elaborate upon (J. Combin. Theory Ser. A, 30, 1981,
183-208) and other work to show that the sequence $|B_n(w)|$ is equivalent to
several invariants of $X_{\{w\}}$. We then give a finite-state labeled
graphical representation $L_w$ of $X_{\{w\}}$ and show that $w$ can be
recovered from the graph isomorphism class of the unlabeled version of $L_w$.
Using $L_w$, we apply ideas from probability and Perron-Frobenius theory to
obtain results comparing features of $X_{\{w\}}$ for different $w$. Next, we
give partial results on the problem of classifying the spaces $X_{\{w\}}$ up to
conjugacy. Finally, we extend some of our results to spaces of
multi-dimensional arrays that avoid a given finite pattern.