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Complex Approximations, Orthogonal Polynomials and Applications Workshop
June 8, 2021 11:00–11:40, Sochi
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Matrix-valued orthogonal polynomials related to hexagon tilings
A. Kuijlaars Katholieke Universiteit Leuven
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Abstract:
I will discuss a class of matrix-valued orthogonal polynomials (MVOPs)
that are related to 2-periodic lozenge tilings of a hexagon.
The general model depends on many parameters. In the cases of constant
and 2-periodic parameter values we show that the MVOP can be expressed in
terms of scalar polynomials with non-Hermitian orthogonality on a closed
contour in the complex plane. The 2-periodic hexagon tiling model with a
constant parameter has a phase transition in the large size limit.
This is reflected in the asymptotic behavior of the MVOP as the degree
tends to infinity. The connection with the scalar orthogonal polynomials
allows us to find the limiting behavior of the zeros of the determinant of the MVOP.
The zeros tend to a curve in the complex plane that has a self-intersection.
The zeros of the individual entries of the MVOP show a different behavior
and we find the limiting zero distribution of the upper right entry under
a geometric condition that we were unable to prove,
but that is convincingly supported by numerical evidence.
The talk is based on the preprint arXiv:2104.14822, that is
joint work with Alan Groot.
Language: English
Website:
https://us02web.zoom.us/j/8618528524?pwd=MmxGeHRWZHZnS0NLQi9jTTFTTzFrQT09
* Zoom conference ID: 861 852 8524 , password: caopa |
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