Quantitative wave-particle duality in uniform multipath interferometers with symmetric which-path detector states

TL;DR

This paper establishes entropic wave-particle duality relations in N-path interferometers with symmetric detector states, providing exact quantifications of which-path information and coherence, and analyzing conditions for duality saturation.

Contribution

It introduces a general optimal discrimination measurement framework with a closed-form solution, enabling precise duality relations and saturation analysis in multipath interferometers.

Findings

Duality relations are tighter at zero separation level (=0).

Saturation of duality occurs only in nonprime N-path interferometers.

Detector states that saturate the duality span n-dimensional subspaces, with n dividing N.

Abstract

A quantum system (quanton) traverses an interferometer with $N$ equally probable paths and interacts with another quantum system (detector) that stores path information in a set of symmetric states. In this interferometric framework, we present entropic wave-particle duality relations between quantum coherence, characterized by the relative entropy of coherence of the quanton state, and which-path knowledge, quantified by the mutual information obtained through detector-state discrimination. By applying a general optimal discrimination measurement, which has a closed-form solution and encompasses other fundamental strategies as special cases, we provide an exact quantification of which-path knowledge in a variety of scenarios. This measurement is carried out in two steps. First, an optimal separation map with a prescribed separation level $\xi\in [0,1]$ probabilistically reduces the overlaps between the input detector states with maximum success rate, or increases them in case of failure. Then, a minimum-error (ME) measurement discriminates either only the successful outputs (standard approach) or both the successful and failure outputs (concatenated approach). We show that the duality relation is tighter at $\xi=0$, where both approaches reduce to the ME measurement. For $\xi>0$, each approach yields a distinct relation that becomes less tight as $\xi$ increases, with the concatenated one providing the tighter bound. Finally, by using the discrete uncertainty principle, we determine the sets of detector states that lead to saturation of the duality relation, showing that they span $n$-dimensional subspaces of the detector space, where $n$ divides $N$. As a result, nontrivial saturation occurs only for interferometers with a nonprime number of paths. From the identified saturating sets, we highlight how the quanton-detector correlations underlie this phenomenon.