1. Average output entropy for quantum channels
- Author
-
Christopher King and David K. Moser
- Subjects
Physics ,Quantum Physics ,Conjecture ,Mathematics::Commutative Algebra ,FOS: Physical sciences ,Closed expression ,Statistical and Nonlinear Physics ,Lambda ,Combinatorics ,Qubit ,Entropy (information theory) ,Quantum Physics (quant-ph) ,Quantum ,Mathematical Physics - Abstract
We study the regularized average Renyi output entropy $\bar{S}_{r}^{\reg}$ of quantum channels. This quantity gives information about the average noisiness of the channel output arising from a typical, highly entangled input state in the limit of infinite dimensions. We find a closed expression for $\beta_{r}^{\reg}$, a quantity which we conjecture to be equal to $\Srreg$. We find an explicit form for $\beta_{r}^{\reg}$ for some entanglement-breaking channels, and also for the qubit depolarizing channel $\Delta_{\lambda}$ as a function of the parameter $\lambda$. We prove equality of the two quantities in some cases, in particular we conclude that for $\Delta_{\lambda}$ both are non-analytic functions of the variable $\lambda$., Comment: 32 pages, several plots and figures; positivity condition added for Theorem on entanglement breaking channels; new result for entrywise positive channels
- Published
- 2011
- Full Text
- View/download PDF