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| FIELD | Math:Analysis |
|---|---|
| DATE | February 24 (Wed), 2021 |
| TIME | 17:00-18:00 |
| PLACE | Online |
| SPEAKER | Byun, Sungsoo |
| HOST | Kang, Nam-Gyu |
| INSTITUTE | ¼¿ï´ëÇб³ |
| TITLE | Almost-Hermitian random matrices and bandlimited point processes: microscopic scaling limits |
| ABSTRACT | In this talk, I will discuss almost Hermitian random matrices associated with classical Gaussian and Laguerre unitary ensembles. Based on the approach of Ward¡¯s equation and cross-section convergence, I will explain a way to deduce the bulk scaling limits, which interpolate sine and Ginbre point processes. Moreover I will present the edge scaling limits, which provide non-Hermitian extensions of Airy/Bessel point processes and explain some generalisations of bulk scaling limits. This is based on joint work with Yacin Ameur. |
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