Difference between revisions of "Differential Geometry II - 2020"
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* Gauss equations | * Gauss equations | ||
− | Def: 2nd FF \(h(X,Y)\) and \(h_N(X,Y)\) (Mind: | + | Def: 2nd FF \(h(X,Y)\) and \(h_N(X,Y)\) (Mind: How are the LC-connections \(D,\bar{D}\) and metrics \(g,\bar{g}\) of \(M\) and \(\bar{M}\) related) |
Proof: Show symmetry of (\h\) | Proof: Show symmetry of (\h\) |
Revision as of 09:20, 10 August 2020
Niko, 6.8.2020
- Levi-Civita Connection:
Def: torsion-free and compatible with metric
Koszul-Formula
Uniqueness of L-C-Connection
(Mentioned case of Lie-group with bi-invariant Riem. metric and left-invariant vector fields, but I didn't remember and we just skipped that)
- Rauch comparison theorem
Def: Jacobi Field (and geometric interpretation)
Thm 3.18: Statement
- Gauss equations
Def: 2nd FF \(h(X,Y)\) and \(h_N(X,Y)\) (Mind: How are the LC-connections \(D,\bar{D}\) and metrics \(g,\bar{g}\) of \(M\) and \(\bar{M}\) related)
Proof: Show symmetry of (\h\)
State Gauss equations
State in terms of \(sec\) instead of \(R\)
- Hadamard, Cartan
State theorem 4.12
Claim in proof: \(sec\leq0\) implies no conjugate points. (This was an exercise in script)
Prove claim.