Immersed stable minimal hypersurfaces whose non-immersed singular set has H^{n-2} measure zero are smooth outside a closed set of dimension at most n-7.
Journal of Differential Geometry , volume=
2 Pith papers cite this work. Polarity classification is still indexing.
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math.DG 2years
2026 2verdicts
UNVERDICTED 2representative citing papers
Proves Lojasiewicz inequality for W-entropy near generalized cylinders in Ricci flow, yielding strong uniqueness of tangent flows and horizontal parabolic k-rectifiability of the corresponding singularity set.
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An Optimal Regularity Theory for Immersed Stable Minimal Hypersurfaces with Small Singular Set
Immersed stable minimal hypersurfaces whose non-immersed singular set has H^{n-2} measure zero are smooth outside a closed set of dimension at most n-7.
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Strong uniqueness and rectifiability of generalized cylindrical singularities in Ricci flow
Proves Lojasiewicz inequality for W-entropy near generalized cylinders in Ricci flow, yielding strong uniqueness of tangent flows and horizontal parabolic k-rectifiability of the corresponding singularity set.