Combinatorial Results on Barcode Lattices

Order Pub Date : 2024-07-30 DOI:10.1007/s11083-024-09670-0
Alex Bouquet, Andrés R. Vindas-Meléndez
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Abstract

A barcode is a finite multiset of intervals on the real line. Jaramillo-Rodriguez (2023) previously defined a map from the space of barcodes with a fixed number of bars to a set of multipermutations, which presented new combinatorial invariants on the space of barcodes. A partial order can be defined on these multipermutations, resulting in a class of posets known as combinatorial barcode lattices. In this paper, we provide a number of equivalent definitions for the combinatorial barcode lattice, show that its Möbius function is a restriction of the Möbius function of the symmetric group under the weak Bruhat order, and show its ground set is the Jordan-Hölder set of a labeled poset. Furthermore, we obtain formulas for the number of join-irreducible elements, the rank-generating function, and the number of maximal chains of combinatorial barcode lattices. Lastly, we make connections between intervals in the combinatorial barcode lattice and certain classes of matchings.

条形码网格的组合结果
条码是实线上区间的有限多集。Jaramillo-Rodriguez (2023) 之前定义了一个从具有固定条数的条形码空间到多变集的映射,它提出了条形码空间的新组合不变式。在这些多变上可以定义一个偏序,从而产生一类被称为组合条形码网格的集合。在本文中,我们为组合条形码网格提供了许多等价定义,证明了其莫比乌斯函数是弱布鲁特阶下对称群的莫比乌斯函数的限制,并证明了其基集是一个标注正集的乔丹-霍尔德集。此外,我们还得到了组合条形码网格的连接-可还原元素数、秩生成函数和最大链数的公式。最后,我们将组合条形码网格中的区间与某些匹配类别联系起来。
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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