Reverses and variations of Young's inequalities with Kantorovich constant (Q2830089)

The classic Young inequality asserts that NEWLINE\[NEWLINEa^\nu b^{1-\nu}\leq\nu a+(1-\nu)b,NEWLINE\]NEWLINE where \(a,b\geq 0\), and \(0\leq\nu\leq 1\), and equality holds if and only if \(a=b\).NEWLINENEWLINEThe inequality has been generalized and refined in many ways in the literature, both for scalars matrices. The authors obtain some improved Young inequalities in Hilbert-Schmidt norm and the reverse versions with Kantorovich constant. Corresponding interpolation inequalities are given. Corollary 2.7 is claimed by the authors to be used to prove a refined interpolated Heinz inequality. However, such an inequality is not explicitly mentioned in the paper.