Simplicial intersection homology revisited

IF 0.5 4区数学 Q3 MATHEMATICS Topology and its Applications Pub Date : 2025-03-01 Epub Date: 2025-01-16 DOI:10.1016/j.topol.2025.109214

David Chataur , Martintxo Saralegi-Aranguren , Daniel Tanré

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Abstract

Intersection homology is defined for simplicial, singular and PL chains and it is well known that the three versions are isomorphic for a full filtered simplicial complex. In the literature, the isomorphism, between the singular and the simplicial situations of intersection homology, uses the PL case as an intermediate. Here we show directly that the canonical map between the simplicial and the singular intersection chains complexes is a quasi-isomorphism. This is similar to the classical proof for simplicial complexes, with an argument based on the concept of residual complex and not on skeletons.

This parallel between simplicial and singular approaches is also extended to the intersection blown-up cohomology that we introduced in a previous work. In the case of an orientable pseudomanifold, this cohomology owns a Poincaré isomorphism with the intersection homology, for any coefficient ring, thanks to a cap product with a fundamental class. So, the blown-up intersection cohomology of a pseudomanifold can be computed from a triangulation. Finally, we introduce a blown-up intersection cohomology for PL spaces and prove that it is isomorphic to the singular one.

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简单交同调的再探讨

定义了单纯链、奇异链和PL链的交同构，众所周知，对于全滤波单纯复合体，这三种形式是同构的。在文献中，在交同构的奇异和简单情况之间的同构，使用PL情况作为中间条件。本文直接证明了简单交链和奇异交链之间的正则映射是一个拟同构。这类似于简单复合体的经典证明，其论证基于剩余复合体的概念，而不是基于骨架。简单方法和奇异方法之间的这种平行关系也被推广到我们在前面的工作中介绍的相交膨胀上同。在可定向伪流形的情况下，由于有一个与基本类的帽积，对于任何系数环，这个上同构与交同构具有poincar同构。因此，伪流形的膨胀交上同调可以由三角剖分计算得到。最后，我们引入了PL空间的一个膨胀交上同调，并证明了它与奇异上同构。

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来源期刊

Topology and its Applications 数学-数学

CiteScore

1.20

自引率

33.30%

发文量

251

审稿时长

6 months

期刊介绍： Topology and its Applications is primarily concerned with publishing original research papers of moderate length. However, a limited number of carefully selected survey or expository papers are also included. The mathematical focus of the journal is that suggested by the title: Research in Topology. It is felt that it is inadvisable to attempt a definitive description of topology as understood for this journal. Certainly the subject includes the algebraic, general, geometric, and set-theoretic facets of topology as well as areas of interactions between topology and other mathematical disciplines, e.g. topological algebra, topological dynamics, functional analysis, category theory. Since the roles of various aspects of topology continue to change, the non-specific delineation of topics serves to reflect the current state of research in topology. At regular intervals, the journal publishes a section entitled Open Problems in Topology, edited by J. van Mill and G.M. Reed. This is a status report on the 1100 problems listed in the book of the same name published by North-Holland in 1990, edited by van Mill and Reed.

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