Welcome to Combinatorics and Optimization

Title: Valuated Delta Matroids and Principal Minors

Abstract: Delta matroids are a generalization of matroids that arise naturally from combinatorial objects such as matchings, ribbon graphs, and principal minors of symmetric and skew symmetric matrices. In this talk, we will define valuated delta matroids and explore their connection with principal minors of Hermitian matrices, generalizing work by Rincón on valuated even delta matroids and skew symmetric matrices. Based on joint work with Nathan Cheung, Gaku Liu, and Cynthia Vinzant.

Title: Eigenpolytopes

Abstract: Each eigenspace of a graph gives rise to a real convex polytope. This connection works best for highly regular graphs - distance-regular graphs or, more generally, walk-regular graphs. I will discuss this relationship and give some applications, including a proof of the Erdos-Ko-Rado theorem.

Title:Almost Regular Matroids

Abstract: Regular matroids form an important and extensively studied class of matroids and have numerous known descriptions and characterizations. In the 1980s, Truemper gave a constructive description of the related class of almost regular matroids: non-regular matroids $M$ such that for every element $e$ of $M$ either $M/e$ or $M\backslash e$ is regular. In this talk, we present a description of almost regular matroids in terms of grafts. A consequence of this description is that almost regular matroids have bounded complexity. We outline some of the proof ideas after introducing the necessary background.