Gap Sequence of Cutting Sequence with Slope $θ=[0;\dot{d}]$ (1408.3724v1)

Abstract: In this paper, we consider the factor properties and gap sequence of a special type of cutting sequence with slope $\theta=[0;\dot{d}]$, denoted by $F_{d,\infty}$. Let $\omega$ be a factor of $F_{d,\infty}$, then it occurs in the sequence infinitely many times. Let $\omega_p$ be the $p$-th occurrence of $\omega$ and $G_p(\omega)$ be the gap between $\omega_p$ and $\omega_{p+1}$. We define the $d$ types of kernel words and envelope words, give two versions of "uniqueness of kernel decomposition property". Using them, we prove the gap sequence ${G_p(\omega)}{p\geq1}$ has exactly two distinct elements for each $\omega$, and determine the expressions of gaps completely. Furthermore, we prove that the gap sequence is $\sigma_i(F{d,\infty})$, where $\sigma_i$ is a substitution depending only on the type of $Ker(\omega)$, i.e. the kernel word of $\omega$. We also determine the position of $\omega_p$ for all $(\omega,p)$. As applications, we study some combinatorial properties, such as the power, overlap and separate property between $\omega_p$ and $\omega_{p+1}$ for all $(\omega,p)$, and find all palindromes in $F_{d,\infty}$.