多面体Novikov同调。

Journal of fixed point theory and Its applications Pub Date : 2021-01-01 Epub Date: 2021-09-24 DOI:10.1007/s11784-021-00899-5

Alessio Pellegrini

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引用次数: 0

摘要

设M为一个封闭流形，a≤H≤dR 1 (M)为一个多面体。对于每个a∈a，我们定义了一个由多面体a编码的具有多重有限条件的Novikov链复形。由此得到的多面体诺维科夫同调推广了普通诺维科夫同调。证明了给定多面体上任意两个上同类在与该多面体相关的Novikov环上产生链同伦等价多面体Novikov配合物。作为应用，我们给出了(扭曲)Novikov Morse同调定理的一种新方法，并证明了一个新的多面体Novikov原理。后者推广了普通的诺维科夫原理和Pajitnov在阿贝尔情况下的最新结果。

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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Polytope Novikov homology.

Let M be a closed manifold and $A \subseteq H_{dR}^{1} (M)$ a polytope. For each $a \in A$ , we define a Novikov chain complex with a multiple finiteness condition encoded by the polytope $A$ . The resulting polytope Novikov homology generalizes the ordinary Novikov homology. We prove that any two cohomology classes in a prescribed polytope give rise to chain homotopy equivalent polytope Novikov complexes over a Novikov ring associated with said polytope. As applications, we present a novel approach to the (twisted) Novikov Morse Homology Theorem and prove a new polytope Novikov Principle. The latter generalizes the ordinary Novikov Principle and a recent result of Pajitnov in the abelian case.

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