Zhidong Bai, Jiang Hu, Guangming Pan, Wang Zhou
Published 2011-05-16Version 1
In the present paper, we prove that under the assumption of the finite sixth moment for elements of a Wigner matrix, the convergence rate of its empirical spectral distribution to the Wigner semicircular law in probability is $O(n^{-1/2})$ when the dimension $n$ tends to infinity.
Convergence rate for a class of supercritical superprocesses
Convergence rate of linear two-time-scale stochastic approximation
On the concentration and the convergence rate with a moment condition in first passage percolation
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