Classical and nonclassical randomness in quantum measurements
Abstract
The space of positive operator-valued measures on the Borel sets of a compact (or even locally compact) Hausdorff space with values in the algebra of linear operators acting on a d-dimensional Hilbert space is studied from the perspectives of classical and non-classical convexity through a transform that associates any positive operator-valued measure with a certain completely positive linear map of the homogeneous C*-algebra into . This association is achieved by using an operator-valued integral in which non-classical random variables (that is, operator-valued functions) are integrated with respect to positive operator-valued measures and which has the feature that the integral of a random quantum effect is itself a quantum effect. A left inverse for yields an integral representation, along the lines of the classical Riesz Representation Theorem for certain linear functionals on , of certain (but not all) unital completely positive linear maps . The extremal and C*-extremal points of the space of POVMS are determined.
Cite
@article{arxiv.1110.1645,
title = {Classical and nonclassical randomness in quantum measurements},
author = {Douglas Farenick and Sarah Plosker and Jerrod Smith},
journal= {arXiv preprint arXiv:1110.1645},
year = {2015}
}
Comments
to appear in Journal of Mathematical Physics