Topology of gradient Ricci shrinkers via weighted L2 cohomology
Abstract
This paper proves several topological results for smooth gradient Ricci shrinkers. We establish upper bounds for the Betti numbers, a vanishing theorem for cohomology, and a dichotomy for the number of ends. We also prove a full Hodge theorem for a large class of shrinkers. The methods are based on weighted L2 cohomology and extend to self-shrinkers of the mean curvature flow.
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