Projectivities of informationally complete measurements

TL;DR

This paper investigates projective realizations of informationally complete measurements for quantum state tomography, presenting new constructions and optimality results, including the first general minimal projective IC measurements in non-prime power dimensions.

Contribution

It introduces the first general construction of minimal projective IC measurements in non-prime power dimensions and explores optimal state determination methods.

Findings

Presented conditions for informational completeness with proofs.

Proposed the first general construction of MPICM in no prime power dimensions.

Analyzed optimality in state determination via single projective measurements.

Abstract

The physical problem behind informationally complete (IC) measurements is determining an unknown state statistically by measurement outcomes, known as state tomography. It is of central importance in quantum information processing such as channel estimating, device testing, quantum key distribution, etc. However, constructing such measurements with good properties is a long-standing problem. In this work, we investigate projective realizations of IC measurements. Conditions of informational completeness are presented with proofs first. Then the projective realizations of IC measurements, including proposing the first general construction of minimal projective IC measurements (MPICM) in no prime power dimensional systems, as well as determining an unknown state in $C^{n}$ via a single projective measurement with some kinds of optimalities in a larger system, are investigated. Finally, The results can be extended to local state tomography. Some discussions on employing several kinds of optimalities are also provided.