V
主页
【ETHZ 2024】代数几何:08.01 Definition of Grassmannians
发布人
https://www.youtube.com/playlist?app=desktop&list=PLq46Q92yretlI4c6WnjJGLyWlYYwNsCYe
打开封面
下载高清视频
观看高清视频
视频下载器
【ETHZ 2024】代数几何:03.02 Properties of regular functions
【ETHZ 2024】代数几何:03.03 Distinguished open subsets
【ETHZ 2024】代数几何:02.09 Dimension theory of reducible spaces
【ETHZ 2024】代数几何:03.01 Definition of regular functions
【ETHZ 2024】代数几何:07.01 Regular functions on projective varieties
【ETHZ 2024】代数几何:12.12 Scheme theoretic intersections and unions
【ETHZ 2024】代数几何:03.06 Extending regular functions over sets of high codimension
叶状结构理论与代数几何——卡罗琳娜·阿劳霍(IMPA)
【ETHZ 2024】代数几何:04.01 Ringed spaces and their morphisms
【ETHZ 2024】代数几何:01.02 Properties of vanishing sets
【ETHZ 2024】代数几何:01.03 Nullstellensatz
【ETHZ 2024】代数几何:02.10 Hypersurfaces and unique factorization domains
【ETHZ 2024】代数几何:12.01 Affine schemes and the spectrum of a ring
【ETHZ 2024】代数几何:08.02 Alternating tensor products
【ETHZ 2024】代数几何:15.03 A criterion for smoothness and the tangent bundle
【ETHZ 2024】代数几何:14.07 Application maps to projective space
【ETHZ 2024】代数几何:01.01 Affine varieties
【ETHZ 2024】代数几何:06.03 Homogeneous polynomials and graded rings
【ETHZ 2024】代数几何:12.10 Examples of morphisms of affine schemes
【ETHZ 2024】代数几何12.05 Regular functions and the structure sheaf of affine schemes
【ETHZ 2024】代数几何:01.06 Affine subvarieties and relative vanishing ideals
Peter Haine - 同伦论与代数几何的互动
【ETHZ 2024】代数几何:08.05 Grassmannians as projective varieties
【ETHZ 2024】代数几何:14.01 The sheaf associated to a module
【ETHZ 2024】代数几何:12.06 Regular functions on distinguished open sets
【ETHZ 2024】代数几何:04.03 Morphisms between affine varieties
【ETHZ 2024】代数几何:04.02 Properties of morphisms of ringed spaces
【ETHZ 2024】代数几何:03.07 Presheaves and sheaves
【ETHZ 2024】代数几何:01.07 Products of affine varieties
【ETHZ 2024】代数几何:02.03 Irreducible affine varieties
【ETHZ 2024】代数几何:06.01 Projective space and homogeneous coordinates
【ETHZ 2024】代数几何:02.08 Dimension of affine varieties
【ETHZ 2024】代数几何:14.04 Pull back of sheaves
【ETHZ 2024】代数几何:02.01 Definition of the Zariski topology
【ETHZ 2024】代数几何:01.04 Consequences of the Nullstellensatz
【ETHZ 2024】代数几何:07.04 The Segre embedding
【ETHZ 2024】代数几何:07.03 Projecting from a point
【ETHZ 2024】代数几何:15.04 Application - The genus of a smooth projective curve
【ETHZ 2024】代数几何:07.05 Closed maps
【ETHZ 2024】代数几何:13.06 Sheafification