# Quantum coherence generating power, maximally abelian subalgebras, and   Grassmannian Geometry

**Authors:** Paolo Zanardi, Lorenzo Campos Venuti

arXiv: 1706.07872 · 2018-01-12

## TL;DR

This paper links the ability of unitary operations to generate quantum coherence with the geometry of maximally abelian subalgebras, using Grassmannian geometry and metrics to quantify coherence generation.

## Contribution

It introduces a geometric framework connecting quantum coherence generating power to Grassmannian distances between abelian subalgebras, providing new measures based on differential geometry.

## Key findings

- Average coherence generated is proportional to Grassmannian distance.
- Embedded Grassmannian into projective space yields novel coherence measures.
- Discusses differential metric structures related to coherence.

## Abstract

We establish a direct connection between the power of a unitary map in $d$-dimensions ($d<\infty$) to generate quantum coherence and the geometry of the set ${\cal M}_d$ of maximally abelian subalgebras (of the quantum system full operator algebra). This set can be seen as a topologically non-trivial subset of the Grassmannian over linear operators. The natural distance over the Grassmannian induces a metric structure on ${\cal M}_d$ which quantifies the lack of commutativity between the pairs of subalgebras. Given a maximally abelian subalgebra one can define, on physical grounds, an associated measure of quantum coherence. We show that the average quantum coherence generated by a unitary map acting on a uniform ensemble of quantum states in the algebra (the so-called coherence generating power of the map) is proportional to the distance between a pair of maximally abelian subalgebras in ${\cal M}_d$ connected by the unitary transformation itself. By embedding the Grassmannian into a projective space one can pull-back the standard Fubini-Study metric on ${\cal M}_d$ and define in this way novel geometrical measures of quantum coherence generating power. We also briefly discuss the associated differential metric structures.

## Full text

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## References

29 references — full list in the complete paper: https://tomesphere.com/paper/1706.07872/full.md

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Source: https://tomesphere.com/paper/1706.07872