This book studies certain spaces of Riemannian metrics on both compact and non-compact manifolds. These spaces are defined by various sign-based curvature conditions, with special attention paid to positive scalar curvature and non-negative sectional curvature, though we also consider positive Ricci and non-positive sectional curvature. If we form the quotient of such a space of metrics under the action of the diffeomorphism group (or possibly a subgroup) we obtain a moduli space. Understanding the topology of both the original space of metrics and the corresponding moduli space form the central theme of this book. For example, what can be said about the connectedness or the various homotopy groups of such spaces? We explore the major results in the area, but provide sufficient background so that a non-expert with a grounding in Riemannian geometry can access this growing area of research.
Author(s): Wilderich Tuschmann, David J. Wraith
Series: Oberwolfach Seminars 46
Edition: 2
Publisher: Birkhäuser Basel
Year: 2015
Language: English
Pages: 127
Tags: Differential Geometry; Algebraic Topology; Manifolds and Cell Complexes (incl. Diff.Topology)
Front Matter....Pages I-X
Spaces of metrics....Pages 1-6
Clifford algebras and spin....Pages 7-16
Dirac operators and index theorems....Pages 17-25
Early results about the space of positive scalar curvature metrics....Pages 27-36
The Kreck-Stolz s-invariant....Pages 37-47
Applications of the s-invariant....Pages 49-58
The Observer Moduli Space....Pages 59-69
A survey of other results....Pages 71-87
Moduli spaces of Riemannian metrics with negative sectional curvature....Pages 89-92
Non-negative sectional curvature moduli spaces on open manifolds....Pages 93-98
The Klingenberg-Sakai conjecture and the space of positively pinched metrics....Pages 99-101
Back Matter....Pages 103-123
