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Test-measured Rényi divergences

One possibility of defining a quantum Rényi $α$-divergence of two quantum states is to optimize the classical Rényi $α$-divergence of their post-measurement probability distributions over all possible measurements (measured Rényi divergence), and maybe regularize these quantities over multiple copies of the two states (regularized measured Rényi $α$-divergence). A key observation behind the theorem for the strong converse exponent of asymptotic binary quantum state discrimination is that the regularized measured Rényi $α$-divergence coincides with the sandwiched Rényi $α$-divergence when $α>1$. Moreover, it also follows from the same theorem that to achieve this, it is sufficient to consider $2$-outcome measurements (tests) for any number of copies (this is somewhat surprising, as achieving the measured Rényi $α$-divergence for $n$ copies might require a number of measurement outcomes that diverges in $n$, in general). In view of this, it seems natural to expect the same when $α<1$; however, we show that this is not the case. In fact, we show that even for commuting states (classical case) the regularized quantity attainable using $2$-outcome measurements is in general strictly smaller than the Rényi $α$-divergence (which is unique in the classical case). In the general quantum case this shows that the above &#34;regularized test-measured&#34; Rényi $α$-divergence is not even a quantum extension of the classical Rényi divergence when $α<1$, in sharp contrast to the $α>1$ case.