Mark Walsh
Published 2013-01-23, updated 2013-07-18Version 3
For dimensions n greater than or equal to 3, we show that the space of metrics of positive scalar curvature on the n-sphere is homotopy equivalent to a subspace which takes the form of a H-space with a homotopy commutative, homotopy associative product operation. This product operation is based on the connected sum construction. We then exhibit an action of the little n-disks operad on this subspace which, using results of Boardman, Vogt and May implies that when n=3 or n is at least 5, the space of metrics of positive scalar curvature on the n-sphere is weakly homotopy equivalent to an n-fold loop space.
Comments: 43 pages, 32 figures. In version 2 we added a line to the introduction acknowledging a relevant new result in the field. In version 3, we correct an error in the proof of the second main result
Spaces of Positive Scalar Curvature metrics on totally nonspin Manifolds with spin boundary
Minimal hypersurfaces and bordism of positive scalar curvature metrics
Cobordism Invariance of the Homotopy Type of the Space of Positive Scalar Curvature Metrics
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