Title: Combinatorics and Geometry in the spooky tropics
Speaker: Angelica Cueto
Abstract: Tropical Geometry has been the subject of a great amount of recent activity over the last decade. Loosely speaking, it can be described as a piecewise linear version of algebraic geometry. It is based on tropical algebra, where the sum of two numbers is their maximum and the product is their sum. This turns polynomials into piecewise-linear functions, and their zero sets into polyhedral complexes. These tropical varieties and their associated "tropical skeletons" retain a surprising amount of geometric information about their classical counterparts.
In this talk, I will give a gentle introduction to the subject and will illustrate this powerful technique through two concrete examples from classical algebraic geometry: the 28 bitangent lines to smooth plane quartics and the 27 lines on smooth cubic surfaces in projective 3-space.
Note: This is part of the Invitations to Mathematics lecture series given each year in Autumn Semester. Pre-candidacy students can sign up for this lecture series by registering for one or two credit hours of Math 6193, class #9226 (with Prof H. Moscovici).
