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Colding, T · 2021 · arXiv 2109.04998

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Topology of gradient Ricci shrinkers via weighted $L^2$ cohomology

math.DG · 2026-05-06 · unverdicted · novelty 5.0

Gradient Ricci shrinkers satisfy topological constraints including bounded Betti numbers and a Hodge theorem via weighted L2 cohomology.

Diameter estimates and Hitchin-Thorpe inequality for four-dimensional compact Quasi-Einstein manifolds

math.DG · 2026-04-22 · unverdicted · novelty 4.0

Compact m-quasi-Einstein manifolds have diameter lower bounds from potential oscillation, which in 4D yield conditions ensuring the Hitchin-Thorpe inequality.

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Topology of gradient Ricci shrinkers via weighted $L^2$ cohomology math.DG · 2026-05-06 · unverdicted · none · ref 23
Gradient Ricci shrinkers satisfy topological constraints including bounded Betti numbers and a Hodge theorem via weighted L2 cohomology.
Diameter estimates and Hitchin-Thorpe inequality for four-dimensional compact Quasi-Einstein manifolds math.DG · 2026-04-22 · unverdicted · none · ref 15
Compact m-quasi-Einstein manifolds have diameter lower bounds from potential oscillation, which in 4D yield conditions ensuring the Hitchin-Thorpe inequality.

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