| Popis: |
Relating to finding possible upper bounds for the probability of error for discriminating between two quantum states, it is well-known that \begin{align*} \mathrm{tr}(A+B) - \mathrm{tr}|A-B|\leq 2\, \mathrm{tr}\big(f(A)g(B)\big) \end{align*} holds for every positive-valued matrix monotone function $f$, where $g(x)=x/f(x)$, and all positive definite matrices $A$ and $B$. This study demonstrates that the set of functions satisfying this inequality includes additional elements and provides illustrative examples to support this claim. Furthermore, we present a characterization of matrix decreasing functions based on a matrix version of the above inequality. |
