独立偏序集

IF 0.4 Q4 MATHEMATICS, APPLIED
H. Thomas, N. Williams
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引用次数: 10

摘要

设$G$是一个有向图。对于g $中的每个顶点$g \,我们在$g $的独立集合上定义了一个对合。我们称这些对合为翻转,并利用它们在独立集合上定义一个新的偏序。修整格通过消除梯度假设对分配格进行推广:一个梯度修整格是一个分配格,每个分配格都是修整格。我们的独立偏集是对分配格的进一步推广,同时也消除了格的要求:一个格的独立偏集总是一个修整格,而每一个修整格都是一个唯一的(直到同构)无环有向图$G$的独立偏集。我们刻画了一个独立偏序集在$G$上是一个具有图论条件的格。我们将行运动的定义从分布格推广到独立偏置集,并证明了它可以用三种不同的方式计算。我们还将我们的构造与某些非循环有限维代数的表示理论中出现的扭转类、半块和2-单心集合联系起来。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Independence posets
Let $G$ be an acylic directed graph. For each vertex $g \in G$, we define an involution on the independent sets of $G$. We call these involutions flips, and use them to define a new partial order on independent sets of $G$. Trim lattices generalize distributive lattices by removing the graded hypothesis: a graded trim lattice is a distributive lattice, and every distributive lattice is trim. Our independence posets are a further generalization of distributive lattices, eliminating also the lattice requirement: an independence poset that is a lattice is always a trim lattice, and every trim lattice is the independence poset for a unique (up to isomorphism) acyclic directed graph $G$. We characterize when an independence poset is a lattice with a graph-theoretic condition on $G$. We generalize the definition of rowmotion from distributive lattices to independence posets, and we show it can be computed in three different ways. We also relate our constructions to torsion classes, semibricks, and 2-simpleminded collections arising in the representation theory of certain acyclic finite-dimensional algebras.
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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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