This assertion follows from the symmetry of the deﬁnition of the doubly minimized SRMI in ( 2.25) with respect to A and B

Proof of Theorem 5 Proof of (a)

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Doubly minimized Petz and sandwiched Renyi mutual information: Operational interpretation from binary quantum state discrimination

quant-ph · 2024-06-05 · unverdicted · novelty 6.0

The direct exponent in binary quantum state discrimination for correlation detection equals the doubly minimized Petz Renyi mutual information for alpha in (1/2,1), while the strong converse exponent equals the doubly minimized sandwiched version for alpha in (1,infty).

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Doubly minimized Petz and sandwiched Renyi mutual information: Operational interpretation from binary quantum state discrimination quant-ph · 2024-06-05 · unverdicted · none · ref 6
The direct exponent in binary quantum state discrimination for correlation detection equals the doubly minimized Petz Renyi mutual information for alpha in (1/2,1), while the strong converse exponent equals the doubly minimized sandwiched version for alpha in (1,infty).

This assertion follows from the symmetry of the deﬁnition of the doubly minimized SRMI in ( 2.25) with respect to A and B

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