Some hybrid matrix triangle inequalities
Abstract
A recent result due to Teng Zhang compares the sum of m matrices and the sum of their quadratic symmetric moduli: \| Σk=1m Ak\| 2 \| Σk=1m |Ak|\| for every unitarily invariant norm. Here |A| is the quadratic mean of |A| and |A*|. We derive operator and eigenvalue refinements of Zhang's inequality from a new polar decomposition for the quadratic symmetric modulus. For instance, | Σk=1m Ak| 22 \ Σk=1m (|Ak|+V|Ak|V*)\ for some unitary matrix V. We also establish the polar decomposition for the maximal modulus associated with Olson's order, and derive, as in the quadratic case, a series of estimates.
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