The conditional uncertainty principle based on majorization relations

Prelegent: 

Waldemar Kłobus, Uniwersytet Adama Mickiewicza w Poznaniu

Data: 

13/04/2016 - 13:15
We develop a general operational framework that formalizes the concept of conditional uncertainty in a measure-independent fashion. The formalism is built around a mathematical relation that we call conditional majorization. We define and characterize conditional majorization, and use it to develop tools for the construction of measures of the conditional uncertainty of individual measurements, and also of the joint conditional uncertainty of sets of measurements. We demonstrate the application of this framework by deriving universal uncertainty relations in several measurement scenarios.

Autor: - | Data utworzenia: 13.04.2016 | Ostatnia modyfikacja: 18.06.2018

Historia zmian

Data aktualizacji: 18/06/2018 - 09:31; autor zmian: ()
We develop a general operational framework that formalizes the concept of conditional uncertainty in a measure-independent fashion. The formalism is built around a mathematical relation that we call conditional majorization. We define and characterize conditional majorization, and use it to develop tools for the construction of measures of the conditional uncertainty of individual measurements, and also of the joint conditional uncertainty of sets of measurements. We demonstrate the application of this framework by deriving universal uncertainty relations in several measurement scenarios.
Data aktualizacji: 26/04/2016 - 20:19; autor zmian: ()
Data aktualizacji: 26/04/2016 - 20:19; autor zmian: ()