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Ágnes Backhausz (ELTE, Rényi Intézet): Application of entropy inequalities to random matrices |
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Monday, 16. June 2025, 15:00 - 17:00
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| Abstract. Motivated by questions from physics, random matrices and their spectral properties have been actively studied since many decades. However, most methods work nicely for symmetric random matrices. In the talk, we present the main ideas of a new approach, coming from graph limit theory, where counting and entropy inequalities can be used to get new results on the empirical entry distribution of the eigenvectors of non-symmetric random matrices with +1/-1 entries. Joint work with Balázs Szegedy. |
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Location : Riesz erem |
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