Quotients of the Drury-Arveson Space and Their Classification in Terms of Complex Geometry

Explore the mathematical intricacies of quotients in the Drury-Arveson space and their classification through complex geometry in this 57-minute lecture from the Fields Institute's Focus Program on Analytic Function Spaces and their Applications. Delivered by Orr Shalit from Technion, delve into topics such as algebraic isomorphism, technical assumptions, hyperbolic metric, and the Drury-Arveson space. Examine counter examples, multipliers by holomorphism, and the concept of "moving up" in this advanced mathematical discourse. Conclude with thought-provoking questions and a discussion on the "house of distance," providing a comprehensive overview of this complex subject matter.

Introduction
Problem A
Defining Quotients
The Problem
Theorem
Algebraic isomorphism
Technical assumptions
mv
soda hyperbolic metric
counter example
multiplier by holomorphism
moving up
DruryArveson space
Questions
House of distance
Question