局部温和代数的非亲和非交叉配合物

Pub Date : 2018-07-12 DOI:10.4171/jca/35
Yann Palu, Vincent Pilaud, Pierre-Guy Plamondon
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引用次数: 31

摘要

从局部温和束缚颤振出发,我们一方面定义了一个简单复形,称为非接吻复形。另一方面,我们构造了一个带有边界的穿孔的、标记的、定向的表面,并赋予了一对对偶解剖。从这些几何数据中,我们定义了两个简单复形:手风琴复形和回转复形,推广了a . Garver和T. McConville在圆盘情况下的工作。我们证明了这三种简单配合物都是同构的,并且它们是纯而薄的。特别地,在它们的面上有一个突变的概念,类似于$\tau$倾斜突变。同时,我们还构造了局部缓约束颤振的同构类集与带边界的穿孔、标记、定向曲面的同胚类集之间的逆双射,并赋予了一对对偶解剖。
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Non-kissing and non-crossing complexes for locally gentle algebras
Starting from a locally gentle bound quiver, we define on the one hand a simplicial complex, called the non-kissing complex. On the other hand, we construct a punctured, marked, oriented surface with boundary, endowed with a pair of dual dissections. From those geometric data, we define two simplicial complexes: the accordion complex, and the slalom complex, generalizing work of A. Garver and T. McConville in the case of a disk. We show that all three simplicial complexes are isomorphic, and that they are pure and thin. In particular, there is a notion of mutation on their facets, akin to $\tau$-tilting mutation. Along the way, we also construct inverse bijections between the set of isomorphism classes of locally gentle bound quivers and the set of homeomorphism classes of punctured, marked, oriented surfaces with boundary, endowed with a pair of dual dissections.
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