Finitary Affine Oriented Matroids

Pub Date : 2024-05-01 DOI:10.1007/s00454-024-00651-z
Emanuele Delucchi, Kolja Knauer
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Abstract

We initiate the axiomatic study of affine oriented matroids (AOMs) on arbitrary ground sets, obtaining fundamental notions such as minors, reorientations and a natural embedding into the frame work of Complexes of Oriented Matroids. The restriction to the finitary case (FAOMs) allows us to study tope graphs and covector posets, as well as to view FAOMs as oriented finitary semimatroids. We show shellability of FAOMs and single out the FAOMs that are affinely homeomorphic to \(\mathbb {R}^n\). Finally, we study group actions on AOMs, whose quotients in the case of FAOMs are a stepping stone towards a general theory of affine and toric pseudoarrangements. Our results include applications of the multiplicity Tutte polynomial of group actions of semimatroids, generalizing enumerative properties of toric arrangements to a combinatorially defined class of arrangements of submanifolds. This answers partially a question by Ehrenborg and Readdy.

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有限仿射定向矩阵
我们开始对任意地面集上的仿射定向矩阵(AOMs)进行公理化研究,获得了诸如最小值、重新定向和自然嵌入定向矩阵复合体框架工作等基本概念。对有限元情况(FAOMs)的限制使我们能够研究pee图和covector posets,并将FAOMs视为定向有限元半似数。我们展示了 FAOMs 的可出壳性,并找出了与\(\mathbb {R}^n\) 亲和同构的 FAOMs。最后,我们研究了 AOMs 上的群作用,FAOMs 的商是通向仿射和环状伪排列一般理论的垫脚石。我们的研究成果包括半球体的群作用的乘数图特多项式的应用,将环状排列的枚举性质推广到组合定义的子实体排列类别。这部分回答了艾伦伯格和雷迪提出的问题。
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