在$12$和$21$的缩减词上的图的直径-通货膨胀

IF 0.4 Q4 MATHEMATICS, APPLIED
Samantha Dahlberg, Young-Hie Kim
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引用次数: 4

摘要

这是一个经典的结果,对称群中的任何置换都可以由相邻的置换序列产生。最小长度的序列称为约简词,本文研究了这些约简词的图,其边由底层Coxeter群中的关系决定。最近,Reiner和Roichman以及Assaf计算了最长排列$n\ldots $ 21$的直径。本文给出了12-膨胀图和许多21-膨胀图直径的归纳公式。这些结果推广到交换和长辫类的相关图。此外,这些结果给出了最长排列直径的递推公式,该公式与Reiner, Roichman和Assaf的公式相匹配。最后,我们在基于底层超平面排列的Reiner和Roichman的直径猜想界上取得了进展,并找到了实现猜想上界和下界的置换族。特别是避免312或231的排列有达到上界的图。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Diameters of graphs on reduced words of $12$ and $21$-inflations
It is a classical result that any permutation in the symmetric group can be generated by a sequence of adjacent transpositions. The sequences of minimal length are called reduced words, and in this paper we study the graphs of these reduced words, with edges determined by relations in the underlying Coxeter group. Recently, the diameter has been calculated for the longest permutation $n\ldots 21$ by Reiner and Roichman as well as Assaf. In this paper we find inductive formulas for the diameter of the graphs of 12-inflations and many 21-inflations. These results extend to the associated graphs on commutation and long braid classes. Also, these results give a recursive formula for the diameter of the longest permutation, which matches that of Reiner, Roichman and Assaf. Lastly, We make progress on conjectured bounds of the diameter by Reiner and Roichman, which are based on the underlying hyperplane arrangement, and find families of permutations that achieve the upper bound and lower bound of the conjecture. In particular permutations that avoid 312 or 231 have graphs that achieve the upper bound.
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来源期刊
Journal of Combinatorics
Journal of Combinatorics MATHEMATICS, APPLIED-
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