Skip to main content

Alejandro Morales: Asymptotics of principal evaluations of Schubert

Time: Thu 2020-01-30 09.00 - 09.50

Location: Institut Mittag-Leffler, Seminar Hall Kuskvillan

Lecturer: Alejandro Morales, University of Massachusetts Amherst

Abstract

Denote by \(u(n)\) the largest principal specialization of the Schubert polynomial of a permutation of size n. Stanley conjectured in 2017 that there is a limit \(\lim_{n\to \infty} \log u(n)\) and asked for a limiting description of permutations achieving the maximum \(u(n)\). Merzon and Smirnov had already conjectured in 2014 that this maximum is achieved on the class of layered permutations. We resolve both Stanley's problems restricted to layered permutations and give improvements on the bound of the possible value for the limit of \(\log u(n)\). This is joint work with Igor Pak and Greta Panova.

Page responsible:webmaster@math.kth.se
Belongs to: Department of Mathematics
Last changed: Jan 22, 2020