Mapping the surgery exact sequence for topological manifolds to analysis

Vito Felice Zenobi
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引用次数: 23

Abstract

In this paper we prove the existence of a natural mapping from the surgery exact sequence for topological manifolds to the analytic surgery exact sequence of N. Higson and J. Roe. This generalizes the fundamental result of Higson and Roe, but in the treatment given by Piazza and Schick, from smooth manifolds to topological manifolds. Crucial to our treatment is the Lipschitz signature operator of Teleman. We also give a generalization to the equivariant setting of the product defined by Siegel in his Ph.D. thesis. Geometric applications are given to stability results for rho classes. We also obtain a proof of the APS delocalised index theorem on odd dimensional manifolds, both for the spin Dirac operator and the signature operator, thus extending to odd dimensions the results of Piazza and Schick. Consequently, we are able to discuss the mapping of the surgery sequence in all dimensions.
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映射手术精确序列的拓扑流形分析
本文证明了拓扑流形的外科精确序列到N. Higson和J. Roe的解析外科精确序列的自然映射的存在性。这推广了Higson和Roe的基本结果,但在Piazza和Schick给出的处理中,从光滑流形到拓扑流形。对我们的治疗至关重要的是Teleman的Lipschitz签名算子。我们还对西格尔博士论文中所定义的积的等变设置进行了推广。给出了rho类稳定性结果的几何应用。对于自旋狄拉克算子和签名算子,我们也得到了在奇维流形上APS离域指标定理的证明,从而将Piazza和Schick的结果推广到奇维。因此,我们能够讨论手术序列在所有维度上的映射。
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