|Date: Wednesday, September 22, 2021
Location: 4088 East Hall (2:30 PM to 4:00 PM)
Title: A combinatorial introduction to Macdonald polynomials
Abstract: We begin by combinatorially defining Macdonald polynomials and discussing their relationship to other symmetric functions. We will then define the nabla operator and state the Shuffle Theorem. If time permits, we will explore the relationship between Macdonald polynomials and the ring of diagonal coinvariants.
Speaker: Sunita Chepuri