This talk is an introduction to the AdS/CFT or gauge-gravity correspondence. We will cover ideas like metric spaces, separation of scales, an introduction to quantum field theory, and a glimpse into stringy gravity. This talk is accessible to undergraduate math and physics students at all levels. It does not require prior knowledge of any of the terms mentioned above. More at https://www.arjunkudinoor.com/talks/gauge-gravity-qgp-talk

Lie groups play a big role in many areas of mathematics and have a beautiful structure theory with a nice classification (which involves structures like root systems). Langlands observed that a certain simple-looking involution on root system shows up in a certain very deep and mysterious way in the theory of automorphic forms and related fields. Naturally, since the completion of the classification, Lie theorists have been looking for objects that extend and generalize the classical theory. One of such potential extensions will be discussed in this lecture.

The sphere-packing problem in any dimension asks how one can place non-overlapping balls in R^d and cover the largest possible fraction of space. The aim of this talk is to give an overview of the ideas in Maryna Viazovska's solution to the sphere packing problem in 8 dimensions using modular forms. We will introduce the crucial theorem she used, then define and discuss the properties of modular forms, and finally give a sketch of her proof.

In the spirit of the celebrated Komlos theorem, we develop versions of the Weak, the Strong, and the Hsu-Robbins-Erdos Laws of Large Numbers, which are valid along appropriate (“lacunary”) subsequences of arbitrary sequences of random variables with bounded moments; as well as along all further (“hereditary”) subsequences of said subsequences. We review also the strong connections of this subject with lacunary trigonometric series. Joint work with Walter Schachermayer, Vienna.