On the Number of Non-equivalent Parameterized Squares in a String

arXiv - CS - Discrete Mathematics Pub Date : 2024-08-09 DOI:arxiv-2408.04920
Rikuya Hamai, Kazushi Taketsugu, Yuto Nakashima, Shunsuke Inenaga, Hideo Bannai
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Abstract

A string $s$ is called a parameterized square when $s = xy$ for strings $x$, $y$ and $x$ and $y$ are parameterized equivalent. Kociumaka et al. showed the number of parameterized squares, which are non-equivalent in parameterized equivalence, in a string of length $n$ that contains $\sigma$ distinct characters is at most $2 \sigma! n$ [TCS 2016]. In this paper, we show that the maximum number of non-equivalent parameterized squares is less than $\sigma n$, which significantly improves the best-known upper bound by Kociumaka et al.
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关于字符串中非等价参数化正方形的数量
当$x$,$y$字符串的$s=xy$且$x$和$y$的参数化等价时,字符串$s$被称为参数化正方形。Kociumaka 等人的研究表明,在长度为 $n$ 的字符串中,包含 $\sigma$ 不同字符的参数化正方形的数量最多为 2 \sigma!n$[TCS 2016]。在本文中,我们证明了非等价参数化正方形的最大数目小于 $\sigma n$,这大大改进了 Kociumaka 等人的已知上界。
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arXiv - CS - Discrete Mathematics
arXiv - CS - Discrete Mathematics
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