YoVDO

Quivers, Flow Trees, and Log Curves

Offered By: M-Seminar, Kansas State University via YouTube

Tags

Quiver Courses Combinatorics Courses Mathematical Physics Courses Algebraic Geometry Courses Gromov-Witten Invariants Courses Tropical Geometry Courses Toric Varieties Courses Donaldson-Thomas Invariants Courses

Course Description

Overview

Save Big on Coursera Plus. 7,000+ courses at $160 off. Limited Time Only!
Explore a comprehensive lecture on the relationship between Donaldson-Thomas invariants, quivers with potential, and log Gromov-Witten invariants. Delve into the universal formula expressing DT invariants in terms of attractor DT invariants, and examine how the coefficients in this formula are calculated using attractor flow trees. Discover the groundbreaking research by Bousseau and Arguz, which proves that these coefficients are genus 0 log Gromov-Witten invariants of d-dimensional toric varieties. Investigate the log-tropical correspondence theorem that connects (d-2)-dimensional families of tropical curves obtained from universal deformations of attractor flow trees to rational log curves in toric varieties. Gain insights into this complex mathematical topic through the expertise of Pierrick Bousseau from the University of Georgia, presented at the M-Seminar at Kansas State University.

Syllabus

Pierrick Bousseau - Quivers, flow trees and log curves


Taught by

M-Seminar, Kansas State University

Related Courses

Log Symplectic Pairs and Mixed Hodge Structures
IMSA via YouTube
Enumerative Geometry and the Quantum Torus
IMSA via YouTube
Quantum Toric Geometry I
IMSA via YouTube
An Introductory Mini Course into Quantum Toric Geometry Lecture I - Day 1
IMSA via YouTube
Mirror Symmetry for Fano Orbifolds - Lecture 01
ICTP Mathematics via YouTube