# 11/19/2019: Introduction to 3 Manifolds (Schultens)
/home/zack/Dropbox/Library/Schultens/Introduction to 3 Manifolds (732)/Introduction to 3 Manifolds - Schultens.pdf
Last Annotation: 11/19/2019
## Highlights
- Definition 1 \. 1 \. 10\. Let L, M be manifolds\. A map f : L M is an embedding if it is a homeomorphism onto its image f\(L\) and f \(L\) is a submanifold of M\. (Schultens 16)
- Definition 1 \. 1 \. 10\. Let L, M be manifolds\. A map f : L M is an embedding if it is a homeomorphism onto its image f\(L\) and f \(L\) is a submanifold of M\. (Schultens 16)
- Definition 1 \. 1 \. 10\. Let L, M be manifolds\. A map f : L M is an embedding if it is a homeomorphism onto its image f\(L\) and f \(L\) is a submanifold of M\. (Schultens 16)
- Definition 1 \. 1 \. 10\. Let L, M be manifolds\. A map f : L M is an embedding if it is a homeomorphism onto its image f\(L\) and f \(L\) is a submanifold of M\. (Schultens 16)
- Definition 1 \. 1 \. 10\. Let L, M be manifolds\. A map f : L M is an embedding if it is a homeomorphism onto its image f\(L\) and f \(L\) is a submanifold of M\. (Schultens 16)