18.156 Projection Theory (Spring 2023, MIT OCW). Instructor: Prof. Lawrence D Guth. The class studies projection theory, starting from the first questions and building up to recent developments. Projection theory studies how a set X behaves under different orthogonal projections. Questions of this type aren't usually emphasized in the graduate analysis curriculum, but they come up in many areas of math, including harmonic analysis, analytic number theory, additive combinatorics, and homogeneous dynamics.
We will survey several applications of projection theory. For each topic, we will introduce and motivate the topic and see how it connects with projection theory. We will prove something about each topic but not necessarily the strongest results.
(from ocw.mit.edu)
Lecture 08 - The Szemeredi-Trotter Theorem
The Szemeredi-Trotter theorem gives the sharp answer to a natural discrete projection problem in the plane. The proof of the theorem is based on topology, and it is completely different from the proofs we have explored earlier.