Blowing up
![6. Blowing up Let Φ: PP 2 Be the Map [X : Y : Z] -→ [YZ : XZ : XY ]](http://data.docslib.org/img/264x/21c81460130e0171c3df4c8f11154e68.webp)
![Arxiv:1707.07347V2 [Math.AG] 7 Sep 2018 Cartier Is Necessary for Defining C· L](http://data.docslib.org/img/264x/31df2b7155a7c26e94565c33c2b2c346.webp)
Top View
- Virtual Cartier Divisors and Blow-Ups
- Asymptotic Invariants of Line Bundles
- Some Applications of K-Stability and K-Energy
- Projective Bundle and Blow-Up
- On the Morse–Novikov Cohomology of Blowing up Complex Manifolds Volume 358, Issue 1 (2020), P
- Foundations of Algebraic Geometry Classes 49 and 50
- Lecture 5: Some Basic Constructions in Symplectic Topology
- Notes of Algebraic Geometry
- 9. Birational Maps and Blowing Up
- Arxiv:2001.10557V1 [Math.AG] 28 Jan 2020 N -Oytblt Tsffie Ots Nall on Test to Suffices It K-Polystability and Mohand Smooth Oolr 1.3
- Blow-Ups in Algebraic Geometry
- Hard Lefschetz Conjecture and Hodge Standard Conjecture on Blowing-Up of Projective Spaces
- 18.727 Topics in Algebraic Geometry: Algebraic Surfaces Spring 2008
- Surface-Fibrations, Four-Manifolds, and Symplectic Floer Homology
- Computation of Blowing up Centers
- Cohomology of Standard Blowing-Up
- Examples of Blown up Varieties Having Projective Bundle Structures
- Arxiv:1907.13281V1 [Math.AG]