中央图形排列的Pak-Stanley标记

IF 0.4 Q4 MATHEMATICS, APPLIED Journal of Combinatorics Pub Date : 2018-11-29 DOI:10.4310/joc.2021.v12.n4.a1
M. Mazin, Joshua Miller
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引用次数: 0

摘要

最初的Pak-Stanley标记被Pak和Stanley定义为从扩展的Shi排列的区域集到停车函数集的双射映射。这个图后来被推广到与图和有向多图有关的其他排列。在这些更一般的情况下,地图不再是双射的。然而,Hopkins和Perkinson以及后来的第一作者证明了它是$G$停放函数集合的满射,其中$G$是与排列相关的多图。这就引出了一个很自然的问题:广义Pak-Stanley映射什么时候是双射的?本文在有心超平面排列的特殊情况下,即所有的超平面都经过一个公点的情况下,回答了这个问题。
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Pak–Stanley labeling for central graphical arrangements
The original Pak-Stanley labeling was defined by Pak and Stanley as a bijective map from the set of regions of an extended Shi arrangement to the set of parking functions. This map was later generalized to other arrangements associated with graphs and directed multigraphs. In these more general cases the map is no longer bijective. However, it was shown Hopkins and Perkinson and then the first author that it is surjective to the set of the $G$-parking functions, where $G$ is the multigraph associated with the arrangement. This leads to a natural question: when is the generalized Pak-Stanley map bijective? In this paper we answer this question in the special case of centered hyperplane arrangements, i.e. the case when all the hyperplanes of the arrangement pass through a common point.
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来源期刊
Journal of Combinatorics
Journal of Combinatorics MATHEMATICS, APPLIED-
自引率
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发文量
21
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