Positive scalar curvature and connected sums
Abstract
Let N be a closed enlargeable manifold in the sense of Gromov-Lawson and M a closed spin manifold of equal dimension, a famous theorem of Gromov-Lawson states that the connected sum M\# N admits no metric of positive scalar curvature. We present a potential generalization of this result to the case where M is nonspin. We use index theory for Dirac operators to prove our result.
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