Riddhipratim Basu, Arup Bose, Shirshendu Ganguly, Rajat Subhra Hazra
Published 2011-08-20, updated 2012-04-18Version 2
We study the joint convergence of independent copies of several patterned matrices in the noncommutative probability setup. In particular, joint convergence holds for the well known Wigner, Toeplitz, Hankel, reverse circulant and symmetric circulant matrices. We also study some properties of the limits. In particular, we show that copies of Wigner becomes asymptotically free with copies of any of the above other matrices.
Comments: 31 pages, 4 figures. Substantial change in the introduction. Typos corrected
On limiting spectral distribution and joint convergence of some patterned random matrices
Fluctuation of eigenvalues of symmetric circulant matrices with independent entries
Fluctuations of eigenvalues of patterned random matrices
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