Self-contained proof of Gromov's dihedral rigidity conjecture on scalar curvature in dimension three, using a simplified version of the approach from two prior preprints.
On Gromov’s flat corner domination c onjecture and Stoker’s conjecture
2 Pith papers cite this work. Polarity classification is still indexing.
2
Pith papers citing it
fields
math.DG 2verdicts
UNVERDICTED 2representative citing papers
Proves scalar curvature rigidity for L^∞ metrics on S^n minus high-codimension subsets with wrapping property, plus analogous result for tori and positive mass theorem corollary for L^∞ AF spin manifolds.
citing papers explorer
-
Gromov's dihedral rigidity conjecture in dimension three
Self-contained proof of Gromov's dihedral rigidity conjecture on scalar curvature in dimension three, using a simplified version of the approach from two prior preprints.
-
Scalar curvature rigidity of spheres with subsets removed and $L^\infty$ metrics
Proves scalar curvature rigidity for L^∞ metrics on S^n minus high-codimension subsets with wrapping property, plus analogous result for tori and positive mass theorem corollary for L^∞ AF spin manifolds.