Scholars@Duke

Stability for the 3D Riemannian Penrose inequality

Publication ,  Journal Article
Dong, C
Published in: Geometry and Topology
January 1, 2025
Published version (DOI)

We show that the Schwarzschild 3-manifold is stable for the 3-dimensional Riemannian Penrose inequality in the pointed measured Gromov–Hausdorff topology, modulo negligible domains and boundary area perturbations.

Duke Scholars

Conghan Dong
Author Conghan Dong Mathematics

Published In

Geometry and Topology

DOI

10.2140/gt.2025.29.4911

EISSN

1364-0380

ISSN

1465-3060

Publication Date

January 1, 2025

Volume

29

Issue

9

Start / End Page

4911 / 4945

Related Subject Headings

  • Geological & Geomatics Engineering
  • 4904 Pure mathematics
  • 0101 Pure Mathematics
 

Citation

APA
Chicago
ICMJE
MLA
NLM
Dong, C. (2025). Stability for the 3D Riemannian Penrose inequality. Geometry and Topology, 29(9), 4911–4945. https://doi.org/10.2140/gt.2025.29.4911
Dong, C. “Stability for the 3D Riemannian Penrose inequality.” Geometry and Topology 29, no. 9 (January 1, 2025): 4911–45. https://doi.org/10.2140/gt.2025.29.4911.
Dong C. Stability for the 3D Riemannian Penrose inequality. Geometry and Topology. 2025 Jan 1;29(9):4911–45.
Dong, C. “Stability for the 3D Riemannian Penrose inequality.” Geometry and Topology, vol. 29, no. 9, Jan. 2025, pp. 4911–45. Scopus, doi:10.2140/gt.2025.29.4911.
Dong C. Stability for the 3D Riemannian Penrose inequality. Geometry and Topology. 2025 Jan 1;29(9):4911–4945.

Published In

Geometry and Topology

DOI

10.2140/gt.2025.29.4911

EISSN

1364-0380

ISSN

1465-3060

Publication Date

January 1, 2025

Volume

29

Issue

9

Start / End Page

4911 / 4945

Related Subject Headings

  • Geological & Geomatics Engineering
  • 4904 Pure mathematics
  • 0101 Pure Mathematics