The embedding problem of the ranges of a Hilbert space under the compact positive operators (Q2812283)

Let \(\mathcal H\) be a separable Hilbert space and \(T\) be a compact positive operator on \(\mathcal H\). The authors show that \(T({\mathcal H})\) with the Minkowski norm \(q_T\) (relative to \(T\)) is a Banach space. Using this, they show that if \(T_1\) and \(T_2\) are compact positive operators on \(\mathcal H\) such that the upper growth order of \(T_1\) is not equal to the lower growth order of \(T_2\), then there is no embedding of \((T_1({\mathcal H}), q_{T_1})\) into \((T_2({\mathcal H}), q_{T_2})\).