Geometric phase of arbitrary Mueller evolutions and its two-level quantum analogue

TL;DR

This paper characterizes the intrinsic geometric phase structure of Mueller transformations and extends the concept to two-level quantum systems, clarifying their invariant holonomic properties.

Contribution

It identifies the unique geometric phase component of Mueller matrices and establishes a quantum analogue for open two-level dynamics using the Choi representation.

Findings

The retarding part of the characteristic pure component defines a canonical holonomic content.

Mueller matrices do not determine a unique interferometric geometric phase.

A quantum analogue for open two-level systems is established in the Choi representation.

Abstract

We identify, for a general physically realizable Mueller transformation, the only intrinsic geometricphase structure that can be assigned to it in an invariant manner: the retarding part of the characteristic pure component selected by the characteristic decomposition, which defines a canonical holonomic content. A Mueller matrix does not, in general, determine a unique observed interferometric (Pancharatnam) geometric phase, since the latter depends on the specific physical realization of the transformation and on the interferometric readout. The remaining characteristic layers may modify the measured complex visibility, and even its observed argument through convex averaging, but they do not define a unique geometric holonomy of their own. We further establish the quantum analogue for open two-level dynamics within the Choi representation.