Physics Asked by Zouba on November 16, 2020
Let $mathcal{N} : M_n to M_n$ be a unital quantum channel (hence trace preserving and completely positive).
Do we have the inequality $Q^{(1)}(mathcal{N}) leq chi(mathcal{N})$ ?
Here $chi(mathcal{N})$ is the Holevo capacity (or Holevo information) of $T$ and $Q^{(1)}(mathcal{N})$ is the coherent information of $mathcal{N}$.
I ask this question since I know that $Q(mathcal{N}) leq C(mathcal{N})$ where $Q(mathcal{N})$ and $C(mathcal{N})$ are the regularized version of $Q^{(1)}(mathcal{N})$ and $chi(mathcal{N})$.
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