比利时vs摩洛哥足彩
,
university of california san diego
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math 288 - probability and statistics
jorge garza-vargas
uc berkeley
spectral stability under random perturbations
abstract:
abstract: consider an $n\times n$ deterministic matrix $a$ and a random matrix $m$ with independent standard gaussian entries. in this talk i will discuss recent results that state that, if $||a||\leq 1$, for any $\delta \textgreater 0$, with high probability $a+\delta m$ has eigenvector condition number of order poly$(n/\delta)$ and eigenvalue gaps of order poly$(\delta/n)$, which implies that the randomly perturbed matrix has a stable spectrum. this has useful applications to numerical analysis and was used to obtain the fastest known provable algorithm for diagonalizing an arbitrary matrix. this is joint work with jess banks, archit kulkarni and nikhil srivastava.
benson au
october 8, 2020
11:00 am
for zoom id and password email: bau@ucsd.edu
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