Page Summary: In this video we prove the map from Spec A [f^-1] to Spec A is an open embedding and that it has a universal property. We begin with a duality between Grassmannians and then study the Grassmannian of lines in P3.
Lecture 19 Modern Algebraic Geometry -
In this video we prove the map from Spec A [f^-1] to Spec A is an open embedding and that it has a universal property. We begin with a duality between Grassmannians and then study the Grassmannian of lines in P3. The talk was organized by the EPFL AI Center, as part of our AI Fundamentals series.
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- In this video we prove the map from Spec A [f^-1] to Spec A is an open embedding and that it has a universal property.
- We begin with a duality between Grassmannians and then study the Grassmannian of lines in P3.
- The talk was organized by the EPFL AI Center, as part of our AI Fundamentals series.
- Instructor: Ben Webster, University of Waterloo Date: February 24, 2025
- Instructor: Ben Webster, University of Waterloo Date: February 14, 2025
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