Compact convex structure of measurements and its applications to
simulability, incompatibility, and convex resource theory of
continuous-outcome measurements
- URL: http://arxiv.org/abs/2002.03504v2
- Date: Wed, 8 Apr 2020 05:12:45 GMT
- Title: Compact convex structure of measurements and its applications to
simulability, incompatibility, and convex resource theory of
continuous-outcome measurements
- Authors: Yui Kuramochi
- Abstract summary: We define the measurement space $mathfrakM(E)$ as the set of post-processing equivalence classes of continuous measurements on $E.
We show that the robustness measures of unsimulability and incompatibility coincide with the optimal ratio of the state discrimination probability of measurement(s) relative to that of simulable or compatible measurements.
- Score: 0.0
- License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
- Abstract: We introduce the post-processing preorder and equivalence relations for
general measurements on a possibly infinite-dimensional general probabilistic
theory described by an order unit Banach space $E$ with a Banach predual. We
define the measurement space $\mathfrak{M}(E)$ as the set of post-processing
equivalence classes of continuous measurements on $E .$ We define the weak
topology on $\mathfrak{M} (E)$ as the weakest topology in which the state
discrimination probabilities for any finite-label ensembles are continuous and
show that $\mathfrak{M}(E)$ equipped with the convex operation corresponding to
the probabilistic mixture of measurements can be regarded as a compact convex
set regularly embedded in a locally convex Hausdorff space. We also prove that
the measurement space $\mathfrak{M}(E) $ is infinite-dimensional except when
the system is $1$-dimensional and give a characterization of the
post-processing monotone affine functional. We apply these general results to
the problems of simulability and incompatibility of measurements. We show that
the robustness measures of unsimulability and incompatibility coincide with the
optimal ratio of the state discrimination probability of measurement(s)
relative to that of simulable or compatible measurements, respectively. The
latter result for incompatible measurements generalizes the recent result for
finite-dimensional quantum measurements. Throughout the paper, the fact that
any weakly$\ast$ continuous measurement can be arbitrarily approximated in the
weak topology by a post-processing increasing net of finite-outcome
measurements is systematically used to reduce the discussions to finite-outcome
cases.
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