Young’s inequality and trace

In this note, the matrix trace inequality for positive semidefinite matrices A and B, tr AB m ≤ tr A 2m tr B 2m 1/2 is established, where m is an integer. The above inequality improves the result given by Yang (

Let A andB be positive operators and p, ct, s >/0. Assume either (1) A /> B and fl >~ max{-½(p + 2a), -½(i + 2a)}, or (2) A and B are invertible with log A ~> log B and /3 >/ -a. Then, for any continuous increasing function f on •+ with f(0) = 0, the trace inequality Trf(A~(A'~BPA~)SA ~) <~ Trf(A (p

A geometric proof of Miranda and Thompson's trace inequality is given, via Thompson's singular-value-diagonal-element inequalities. Miranda and Thompson's trace inequality is associated with the unitary group. We then deal with the cases associated with the orthogonal group and the special unitary g