Higher-Categorical Associahedra

Spencer Backman, Nathaniel Bottman, Daria Poliakova
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Abstract

The second author introduced 2-associahedra as a tool for investigating functoriality properties of Fukaya categories, and he conjectured that they could be realized as face posets of convex polytopes. We introduce a family of posets called categorical $n$-associahedra, which naturally extend the second author's 2-associahedra and the classical associahedra. Categorical $n$-associahedra give a combinatorial model for the poset of strata of a compactified real moduli space of a tree arrangement of affine coordinate subspaces. We construct a family of complete polyhedral fans, called velocity fans, whose coordinates encode the relative velocities of pairs of colliding coordinate subspaces, and whose face posets are the categorical $n$-associahedra. In particular, this gives the first fan realization of 2-associahedra. In the case of the classical associahedron, the velocity fan specializes to the normal fan of Loday's realization of the associahedron. For proving that the velocity fan is a fan, we first construct a cone complex of metric $n$-bracketings and then exhibit a piecewise-linear isomorphism from this complex to the velocity fan. We demonstrate that the velocity fan, which is not simplicial, admits a canonical smooth flag triangulation on the same set of rays, and we describe a second, finer triangulation which provides a new extension of the braid arrangement. We describe piecewise-unimodular maps on the velocity fan such that the image of each cone is a union of cones in the braid arrangement, and we highlight a connection to the theory of building sets and nestohedra. We explore the local iterated fiber product structure of categorical $n$-associahedra and the extent to which this structure is realized by the velocity fan. For the class of concentrated $n$-associahedra we exhibit generalized permutahedra having velocity fans as their normal fans.
高等类联方体
第二位作者提出了 2-associahedra 作为研究 Fukaya 范畴矢量性质的工具,并猜想它们可以作为凸多胞形的面posets来实现。我们引入了一个称为分类 $n$-associahedra 的集合族,它自然地扩展了第二作者的 2-associahedra 和经典的 associahedra。分类 n 元-联方体给出了仿射坐标子空间的树状排列的压缩实模空间的层的正集的组合模型。我们构建了一个完整的多面体扇形家族,称为速度扇形,其坐标编码碰撞坐标子空间对的相对速度,其面正集是分类$n$-associahedra。特别是,这给出了2-类群的第一个扇形实现。在经典联立方程的情况下,速度扇形特化为洛代实现的联立方程的法向扇形。为了证明速度扇是一个扇形,我们首先构造了一个度量 $n$ 带的圆锥复数,然后展示了从这个复数到速度扇的片断线性同构。我们证明速度扇虽然不是简面的,但在同一组射线上有一个典型的光滑旗三角剖分,我们还描述了第二个更精细的三角剖分,它提供了辫状排列的新扩展。我们描述了速度扇上的片状非模态映射,使得每个锥体的图像都是辫子排列中锥体的联合,并强调了与建筑集和巢面体理论的联系。我们探讨了类 $n$-associahedra 的局部迭代纤维积结构,以及速度扇在多大程度上实现了这种结构。对于集中 $n$-associahedra 类,我们展示了以速度扇为法扇的广义 permutahedra。
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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