Tytuł | Asymptotic entropic uncertainty relations |
Publication Type | Journal Article |
Rok publikacji | 2016 |
Autorzy | Adamczak R, Latała R, Puchała Z, Życzkowski K |
Journal | J. Math. Phys. |
Volume | 57 |
Start Page | 032204 |
Abstract | Entropic uncertainty relations are analyzed for the case of N-dimensional Hilbert space and two orthogonal measurements performed in two generic bases, related by a Haar random unitary matrix U. We derive estimations for the average norms of truncations of U of a given size, which allow us to study state-independent lower bounds for the sum of two entropies describing the measurements outcomes. In particular, we show that the Maassen–Uffink bound asymptotically behaves as lnN−lnlnN−ln2, while the strong entropic majorization relation yields a nearly optimal bound, lnN−const. Analogous results are also obtained for a more general case of several orthogonal measurements performed in generic bases. |
URL | http://dx.doi.org/10.1063/1.4944425 |
DOI | 10.1063/1.4944425 |