On the topology of the moduli space of positive scalar curvature concordances
Abstract
Let M be a manifold which admits a metric with positive scalar curvature (or a positive intermediate curvature in a suitable sense). We study the moduli space Mpos*(M× I)g of concordances of such metrics (with appropriate boundary conditions) which restrict to a given metric g on M × \0\ ∂ M × I. We show that π4*Mpos*(M × I)g Q ≠ 0 in a stable range provided M is even. We obtain analogous results when positive scalar curvature is replaced by k-positive Ricci curvature for k 2.
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