Graduate Algebraic Geometry Seminar Fall 2017: Difference between revisions

Abstract: I will introduce the techniques used by Asok and Fasel to classify rank-2 vector bundles on a smooth affine 3-fold (arXiv:1204.0770). The problem itself is interesting, and the solution uses the A^1 homotopy category. My main goal is to make this category seem less bonkers.

Abstract: There will be no GAG's talk this week as it conflicts with the computing workshop.

Abstract: I will introduce the techniques used by Asok and Fasel to classify rank-2 vector bundles on a smooth affine 3-fold (arXiv:1204.0770). The problem itself is interesting, and the solution uses the A^1 homotopy category. My main goal is to make this category seem less bonkers.

Abstract: The Grothendieck ring of varieties is an incredibly mysterious object that seems to capture a bunch of arithmetic, geometric, and topological data regarding algebraic varieties. We will explore some of these connections. For example, we will see how the Weil Conjectures are related to stable birational geometry. No background will be assumed and the speaker will try to keep things accessible to all.

Abstract: The Grothendieck ring of varieties is an incredibly mysterious object that seems to capture a bunch of arithmetic, geometric, and topological data regarding algebraic varieties. We will explore some of these connections. For example, we will see how the Weil Conjectures are related to stable birational geometry. No background will be assumed and the speaker will try to keep things accessible to all.

Abstract: Algebraic geometry and the prime spectrum arose from the study of subsets of C^n defined by polynomial equations. In many areas, we are often interested in subsets of R^n defined by polynomial equations and inequalities. This gives rise to real algebraic geometry and the real spectrum. We will introduce the concept of the real spectrum and how it differs from the prime spectrum, as well as some aspects of real commutative algebra. We will use these to discuss and prove Hilbert's 17th problem and move on to real algebraic geometry. If time permits, we will discuss the null-, positiv-, and nichtnegativ- stellensatzes and semi-algebraic geometry. Practically no background is assumed.

Abstract: Algebraic geometry and the prime spectrum arose from the study of subsets of C^n defined by polynomial equations. In many areas, we are often interested in subsets of R^n defined by polynomial equations and inequalities. This gives rise to real algebraic geometry and the real spectrum. We will introduce the concept of the real spectrum and how it differs from the prime spectrum, as well as some aspects of real commutative algebra. We will use these to discuss and prove Hilbert's 17th problem and move on to real algebraic geometry. If time permits, we will discuss the null-, positiv-, and nichtnegativ- stellensatzes and semi-algebraic geometry. Practically no background is assumed.

Abstract: "I seem to have committed myself to supplying abstracts. Unfortunately there is nothing remotely funny about symplectic geometry. I think I've never heard anything less intuitive than studying manifolds with symplectic 2-forms. Nonetheless it seems to be totally central to both enumerative geometry and geometric representation theory. Eva and Moises are going to take the bull by the horns and try to explain it to us.

In order to give the bull a fighting chance, make sure not to let them get away with any "intuitive" remarks treating momenta as cotangent vectors. I'm pretty sure no one has actually understood that since Hamilton."

~Ed~

Abstract:

"When dynamics get hectic

For reasons symplectic

Don't sit and brute-force them all day.

Find nice functions and list them -

Integrable system!

Let symmetries show you the way."

~Ed~

Abstract: TBD

Abstract: I will explain some useful techniques for the study of sheaves on singular curves of arithmetic genus one. In particular, there are many isomorphisms between moduli spaces of different sorts of sheaves on a given curve coming from natural operations on sheaves.

Abstract: I will explain some useful techniques for the study of sheaves on singular curves of arithmetic genus one. In particular, there are many isomorphisms between moduli spaces of different sorts of sheaves on a given curve coming from natural operations on sheaves.

Abstract: Enjoy the break!

Abstract: TBD

Abstract: TBD

Abstract: TBD