Minimum trace norm of real symmetric and Hermitian matrices with zero diagonal

Abstract

We obtain tight lower bounds for the trace norm · 1 of some matrices with diagonal zero, in terms of the entry-wise L1-norm (denoted by · (1)). It is shown that on the space of nonzero real symmetric matrices A of order n with diagonal zero, the minimum value of the quantity A1 A(1) is equal to 2n. The answer of the similar problem in the space of Hermitian matrices, is also obtained to be equal to (π2n). The equivalent "dual" form of these results, give some upper bounds for the distance to the nearest diagonal matrix for a given symmetric or Hermitian matrix, when the distance is computed in the spectral norm.