Infinite connected sums, K-area and positive scalar curvature

Abstract

Whyte used the index theory of Dirac operators and Block-Weiberger uniformly finite homology to show that certain infinite connected sums do not carry a metric with nonnegative scalar curvature in their bounded geometry class. His proof uses a coarse version of the A-class to obstruct such metrics. In this note we prove a version of Whyte's result where a variant of the notion of infinite K-area, originally due to Gromov, is used to obstruct metrics with positive scalar curvature.

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