Video URL
Integrable difference equations and orthogonal polynomials with respect to a deformed semicircle di…Integrable difference equations and orthogonal polynomials with respect to a deformed semicircle distribution
APA
(2024). Integrable difference equations and orthogonal polynomials with respect to a deformed semicircle distribution. SciVideos. https://www.youtube.com/live/325JhYC07ic
MLA
Integrable difference equations and orthogonal polynomials with respect to a deformed semicircle distribution. SciVideos, Oct. 29, 2024, https://www.youtube.com/live/325JhYC07ic
BibTex
@misc{ scivideos_ICTS:30045,
doi = {},
url = {https://www.youtube.com/live/325JhYC07ic},
author = {},
keywords = {},
language = {en},
title = {Integrable difference equations and orthogonal polynomials with respect to a deformed semicircle distribution},
publisher = {},
year = {2024},
month = {oct},
note = {ICTS:30045 see, \url{https://scivideos.org/index.php/icts-tifr/30045}}
}
Abstract
I will revisit some integrable difference equations arising in the study of the distance statistics of random planar maps (discrete surfaces built from polygons). In a paper from 2003 written jointly with P. Di Francesco and E. Guitter, we conjectured a general formula for the so-called ``two-point function'' characterizing these statistics. The first proof of this formula was given much later in a paper from 2012 joint with E. Guitter, where we used bijective arguments and the combinatorial theory of continued fractions. I will present a new elementary and purely analytic proof of the result, obtained by considering orthogonal polynomials with respect to a polynomial deformation of the Wigner semicircle distribution. This talk is based on a work in progress with Sofia Tarricone.