Collapsing constant scalar curvature metrics
Abstract
We prove that a sequence of constant scalar curvature (CSC) metrics which is collapsing with bounded curvature to a manifold (X,g∞) can be perturbed to a sequence of N-invariant collapsing CSC metrics, under a natural assumption involving the eigenvalues of the drift Laplacian on (X,g∞). This answers a special case of a question of Cheeger-Fukaya-Gromov. We also give some natural conditions on the limiting metric-measure space under which the eigenvalue assumption is automatically satisfied.
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