Operator pq norms of Gaussian matrices
Abstract
We confirm the conjecture posed by Guédon, Hinrichs, Litvak, and Prochno in 2017 that E\|(aijgij)i m, j n pn qm\| is comparable, up to constants depending only on p and q, to \[ i \|(aij)j\|p* +j \|(aij)i\|q +E i,j |aijgij| \] provided that 1 p 2 q ∞. This was known before only in the case p=1 or q=∞, and in the spectral case p=2=q. We also reprove the conjecture in the case p=2=q without using spectral theory (which was employed in the previously known proof).
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