Boundary Conditions for Scalar Curvature

Christian Baer, B. Hanke
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引用次数: 20

Abstract

Based on the Atiyah-Patodi-Singer index formula, we construct an obstruction to positive scalar curvature metrics with mean convex boundaries on spin manifolds of infinite K-area. We also characterize the extremal case. Next we show a general deformation principle for boundary conditions of metrics with lower scalar curvature bounds. This implies that the relaxation of boundary conditions often induces weak homotopy equivalences of spaces of such metrics. This can be used to refine the smoothing of codimension-one singularites a la Miao and the deformation of boundary conditions a la Brendle-Marques-Neves, among others. Finally, we construct compact manifolds for which the spaces of positive scalar curvature metrics with mean convex boundaries have nontrivial higher homotopy groups.
标量曲率的边界条件
基于Atiyah-Patodi-Singer指标公式,构造了无限k面积自旋流形上具有平均凸边界的正标量曲率度量的阻碍。我们还描述了极端情况。接下来,我们给出了具有低标量曲率界的度量的边界条件的一般变形原理。这意味着边界条件的松弛通常会导致这类度量空间的弱同伦等价。这可以用于改进共维一奇点的平滑(如Miao)和边界条件的变形(如Brendle-Marques-Neves)等。最后,构造了具有平均凸边界的正标量曲率度量空间具有非平凡高同伦群的紧流形。
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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