Coefficients of Catalan states of lattice crossing II: Applications of ΘA-state expansions

Pub Date : 2024-04-18 DOI:10.1142/s0218216524500032

Mieczyslaw K. Dabkowski, Cheyu Wu

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Abstract

Plucking polynomial of a plane rooted tree with a delay function $α$ was introduced in 2014 by Przytycki. As shown in this paper, plucking polynomial factors when $α$ satisfies additional conditions. We use this result and $Θ_{A}$ -state expansion introduced in our previous work to derive new properties of coefficients $C (A)$ of Catalan states $C$ resulting from an $(m \times n)$ -lattice crossing $L (m, n)$ . In particular, we show that $C (A)$ factors when $C$ has arcs with some special properties. In many instances, this yields a more efficient way for computing $C (A)$ . As an application, we give closed-form formulas for coefficients of Catalan states of $L (m, 3)$ .

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晶格交叉的加泰罗尼亚态系数 II： ΘA 态展开的应用

Przytycki 于 2014 年提出了具有延迟函数 α 的平面有根树的拔取多项式。正如本文所示，当 α 满足附加条件时，拔取多项式会产生因子。我们利用这一结果和之前工作中引入的 ΘA 态扩展，推导出 (m×n)- 格子交叉 L(m,n) 所产生的加泰罗尼亚态 C 的系数 C(A) 的新特性。特别是，我们证明了当 C 具有具有某些特殊性质的弧时，C(A) 的系数。在许多情况下，这将为计算 C(A) 提供更有效的方法。作为应用，我们给出了 L(m,3) 的加泰罗尼亚态系数的闭式公式。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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