Seminar

DDC Junior Seminar: Monodromy groups in algebraic geometry

September 15, 2020 (09:00 AM PDT - 10:00 AM PDT)

Parent Program:	Decidability, definability and computability in number theory: Part 1 - Virtual Semester
Location:	SLMath: Online/Virtual

Speaker(s)

Borys Kadets (University of Georgia)

Description

To participate in this seminar, please register here: https://www.msri.org/seminars/25206

The seminar will feature research talks by the six postdoctoral scholars appointed to the Fall 2020 DDC program, along with talks by students and other pre-tenure researchers associated with this program. Since seminar attendees will have disparate backgrounds, we plan that these talks will not be too advanced, nor will they assume substantial background knowledge. Our postdocs include number theorists, model theorists, and computable structure theorists, and talks can be expected to span all of these areas.

Keywords and Mathematics Subject Classification (MSC)

Primary Mathematics Subject Classification No Primary AMS MSC

Secondary Mathematics Subject Classification No Secondary AMS MSC

Video

Monodromy Groups In Algebraic Geometry

Abstract/Media

To participate in this seminar, please register here: https://www.msri.org/seminars/25206

To a finite unramified covering of nice topological spaces $f: X \to Y$ one can associate a finite permutation group $G$ -- the monodromy group of the covering.

This familiar topological construction has an avatar in algebraic geometry: to a finite unramified ("étale") morphism $\pi: X \to Y$ one associates a finite permutation group $\mathrm{Mon} \ \pi$ .

When $X$ and $Y$ are varieties over the complex numbers $\mathrm{Mon}\ \pi$ is exactly the monodromy group of the topological covering $X(\mathbb{C}) \to Y(\mathbb{C})$ ; however, the algebraic definition makes sense for arbitrary ground fields, and, in fact, subsumes Galois theory: the Galois group of a field extension $L/K$ is the mondromy of the cover $\mathrm{Spec} L \to \mathrm{Spec} K$ .

I will describe how these monodromy groups are defined and calculated in algebraic geometry through concrete examples, and show some applications to geometry of curves and Galois theory.

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Monodromy Groups In Algebraic Geometry

H.264 Video	25150_28648_8499_Monodromy_Groups_in_Algebraic_Geometry.mp4	Download 1080p (3.19 GB) 720p (2.45 GB) 360p (627 MB)