{"title":"A Dichotomy for Finite Abstract Simplicial Complexes","authors":"Sebastian Meyer","doi":"arxiv-2408.08199","DOIUrl":null,"url":null,"abstract":"Given two finite abstract simplicial complexes A and B, one can define a new\nsimplicial complex on the set of simplicial maps from A to B. After adding two\ntechnicalities, we call this complex Homsc(A, B). We prove the following dichotomy: For a fixed finite abstract simplicial\ncomplex B, either Homsc(A, B) is always a disjoint union of contractible spaces\nor every finite CW-complex can be obtained up to a homotopy equivalence as\nHomsc(A, B) by choosing A in a right way. We furthermore show that the first case is equivalent to the existence of a\nnontrivial social choice function and that in this case, the space itself is\nhomotopy equivalent to a discrete set. Secondly, we give a generalization to finite relational structures and show\nthat this dichotomy coincides with a complexity theoretic dichotomy for\nconstraint satisfaction problems, namely in the first case, the problem is in P\nand in the second case NP-complete. This generalizes a result from [SW24]\nrespectively arXiv:2307.03446 [cs.CC]","PeriodicalId":501314,"journal":{"name":"arXiv - MATH - General Topology","volume":"19 1","pages":""},"PeriodicalIF":0.0000,"publicationDate":"2024-08-15","publicationTypes":"Journal Article","fieldsOfStudy":null,"isOpenAccess":false,"openAccessPdf":"","citationCount":"0","resultStr":null,"platform":"Semanticscholar","paperid":null,"PeriodicalName":"arXiv - MATH - General Topology","FirstCategoryId":"1085","ListUrlMain":"https://doi.org/arxiv-2408.08199","RegionNum":0,"RegionCategory":null,"ArticlePicture":[],"TitleCN":null,"AbstractTextCN":null,"PMCID":null,"EPubDate":"","PubModel":"","JCR":"","JCRName":"","Score":null,"Total":0}
引用次数: 0
Abstract
Given two finite abstract simplicial complexes A and B, one can define a new
simplicial complex on the set of simplicial maps from A to B. After adding two
technicalities, we call this complex Homsc(A, B). We prove the following dichotomy: For a fixed finite abstract simplicial
complex B, either Homsc(A, B) is always a disjoint union of contractible spaces
or every finite CW-complex can be obtained up to a homotopy equivalence as
Homsc(A, B) by choosing A in a right way. We furthermore show that the first case is equivalent to the existence of a
nontrivial social choice function and that in this case, the space itself is
homotopy equivalent to a discrete set. Secondly, we give a generalization to finite relational structures and show
that this dichotomy coincides with a complexity theoretic dichotomy for
constraint satisfaction problems, namely in the first case, the problem is in P
and in the second case NP-complete. This generalizes a result from [SW24]
respectively arXiv:2307.03446 [cs.CC]
给定两个有限抽象单纯复数 A 和 B,我们可以在从 A 到 B 的单纯映射集合上定义一个新闻单纯复数。我们将证明以下二分法:对于一个固定的有限抽象单纯复数 B,要么 Homsc(A, B) 总是可收缩空间的不相交联合,要么每个有限 CW 复数都可以通过选择 A 的正确方法得到一个同调等价的 Homsc(A,B)。我们还进一步证明,第一种情况等同于存在一个非琐碎的社会选择函数,在这种情况下,空间本身等同于一个离散集合。其次,我们给出了对有限关系结构的推广,并证明这种二分法与复杂性理论中对约束满足问题的二分法是一致的,即在第一种情况下,问题是在潘德(Pand)中完成的,而在第二种情况下,问题是 NP-完成的。这概括了[SW24]分别来自 arXiv:2307.03446 [cs.CC] 的一个结果。
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