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Submanifold
Ricci Curvature and Minimal Submanifolds
Isoparametric Hypersurfaces with Four Principal Curvatures Revisited
Lecture Notes on Foliation Theory
Lecture 10: Tubular Neighborhood Theorem
Two Classes of Slant Surfaces in Nearly Kahler Six Sphere
Reference Ic/88/392
Types of Integrability on a Submanifold and Generalizations of Gordon’S Theorem
Lecture 9: the Whitney Embedding Theorem
Geometric and Topological Obstructions to Various Immersions in Submanifold Theory and Some Related Open Problems
Integral Formulas for a Foliation with a Unit Normal Vector Field
1. Whitney Embedding Theorem 1.0.1. Let M N Be a Smooth Manifold
The Embedding Theorems of Whitney and Nash
Submanifold Geometry
Lie Groups and Representations Fall 2020 Notes by Patrick Lei
Three-Dimensional Manifolds Michaelmas Term 1999
Lecture Notes on Submanifolds
CHAPTER 6 IMMERSIONS and EMBEDDINGS in This
Arxiv:1204.0861V1 [Math.DG] 4 Apr 2012 Atlas, Uzbekistan
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The Topology of Isoparametric Submanifolds
Introduction to Lie Groups and Lie Algebras
Manifolds the Definition of a Manifold and First Examples
Lie Groups and Lie Algebras (Fall 2019)
A H-Principle for Open Relations Invariant Under Foliated Isotopies
Handlebody Complements in the 3-Sphere: a Remark on a Theorem of Fox
Lecture 3. Submanifolds
Introduction to Immersion, Embedding, and the Whitney Embedding Theorems
Lecture 4 Submanifold Reconstruction
Foliations and Floer Theories
Chapter 4 Manifolds, Lie Groups, and Lie Algebras; “Baby Case”
Three Lectures on Topological Manifolds
When One Manifold Is a Subset on a Second Manifold
Notes on Lie Groups
Notes on Smooth Manifolds
Geometric Topology Geometric Topology Easter 2018
Manifolds of 3-Manifolds