On the matrix Cauchy-Schwarz inequality

Abstract

The main goal of this work is to present new matrix inequalities of the Cauchy-Schwarz type. In particular, we investigate the so-called Lieb functions, whose definition came as an umbrella of Cauchy-Schwarz-like inequalities, then we consider the mixed Cauchy-Schwarz inequality. This latter inequality has been influential in obtaining several other matrix inequalities, including numerical radius and norm results. Among many other results, we show that \[\| T \| 14( \| | T |+| T* |+2 RT \|+\| | T |+| T* |-2 RT \| ),\] where RT is the real part of T.

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