Igor Pak “Combinatorial inequalities“ | The Vinberg Lecture

The Vinberg Lecture Series: Lecture 10 (May 04, 2022) -------- Igor Pak (UCLA, USA) Title: Combinatorial inequalities Abstract: In the ocean of combinatorial inequalities, two islands are especially difficult. First, Mason’s conjectures say that the number of forests in a graph with k edges is log-concave. More generally, the number of independent sets of size k in a matroid is log-concave. Versions of these results were established just recently, in a remarkable series of papers by Huh and others, inspired by algebro-geometric considerations. Second, Stanley’s inequality for the numbers of linear extensions of a poset with value k at a given poset element, is log-concave. This was originally conjectured by Chung, Fishburn and Graham, and famously proved by Stanley in 1981 using the Alexandrov–Fenchel inequalities in convex geometry. No direct combinatorial proof for either result is known. Why not? In the first part of the talk we will survey a number of combinatoria