Norms of Randomized Circulant Matrices
Abstract
We investigate two-sided bounds for operator norms of random matrices with unhomogenous independent entries. We formulate a lower bound for Rademacher matrices and conjecture that it may be reversed up to a universal constant. We show that our conjecture holds up to n factor for randomized n× n circulant matrices and double logarithm may be eliminated under some mild additional assumptions on the coefficients.
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