Gouy phase engineering of self-splitting quantum correlations

A. C. Barbosa; A. L. S. Santos Junior; A. Z. Khoury; G. B. Alves; M. Damaceno; N. A. Ribeiro; P. H. Souto Ribeiro

arxiv: 2604.26816 · v1 · submitted 2026-04-29 · 🪐 quant-ph

Gouy phase engineering of self-splitting quantum correlations

A. L. S. Santos Junior , M. Damaceno , A. C. Barbosa , N. A. Ribeiro , G. B. Alves , P. H. Souto Ribeiro , A. Z. Khoury This is my paper

Pith reviewed 2026-05-07 13:30 UTC · model grok-4.3

classification 🪐 quant-ph

keywords Gouy phasespontaneous parametric down-conversionquantum correlationsMach-Zehnder interferometerNOON stateheralded interferenceself-splittingquantum metrology

0 comments

The pith

Structured pump beam in down-conversion makes two-photon correlations split and recombine like an interferometer.

A machine-rendered reading of the paper's core claim, the machinery that carries it, and where it could break.

The authors structure the pump beam in spontaneous parametric down-conversion with a mode superposition that creates dynamical splitting and recombination through Gouy phase evolution. This classical beam behavior transfers to the signal and idler photons, so their joint probability distribution propagates exactly as a self-splitting and recombining beam. The result is a built-in Mach-Zehnder-like interferometer at the two-photon level. A reader would care because the setup produces observable heralded single-photon interference and two-photon NOON-state interference, which the paper links to potential uses in quantum metrology.

Core claim

In the process of spontaneous parametric down conversion the pump beam is structured with a mode superposition that produces a dynamical splitting and recombination of the light beam. This structure is transferred to the quantum correlations between signal and idler photons. As a result the joint two-photon probability distribution propagates like a self-splitting and recombining light beam, implementing a Mach-Zehnder-like interferometer. We observe heralded single-photon interference and two-photon NOON state interference.

What carries the argument

Gouy phase dynamics from the pump beam's mode superposition, which transfers the classical splitting-recombination pattern directly to the two-photon joint probability distribution.

If this is right

The joint two-photon probability distribution implements a Mach-Zehnder-like interferometer during propagation.
Heralded single-photon interference becomes visible in the measured correlations.
Two-photon NOON state interference is observed in the same setup.
New applications in quantum metrology open through direct engineering of correlation propagation.

Where Pith is reading between the lines

These are editorial extensions of the paper, not claims the author makes directly.

Adjusting the pump superposition could embed controllable phase shifts into quantum correlation patterns for sensing without extra optics.
The approach might extend to higher-order photon states by using more complex pump modes to create multi-path quantum interferometers.
Comparing results across different crystal lengths would test how far the splitting pattern survives before dispersion dominates.

Load-bearing premise

The Gouy phase dynamics from the classical pump mode superposition transfer faithfully to the quantum correlations without significant distortion from crystal properties, propagation effects, or detection inefficiencies.

What would settle it

If two-photon coincidence counts measured at varying propagation distances fail to show splitting and recombination positions that match the Gouy phase shift calculated from the pump mode superposition, the transfer of the dynamics would be falsified.

Figures

Figures reproduced from arXiv: 2604.26816 by A. C. Barbosa, A. L. S. Santos Junior, A. Z. Khoury, G. B. Alves, M. Damaceno, N. A. Ribeiro, P. H. Souto Ribeiro.

**Figure 1.** Figure 1: FIG. 1. Self-splitting beam dynamics under free propagation. view at source ↗

**Figure 2.** Figure 2: FIG. 2. Experimental setup. A 405 nm CW laser is shaped view at source ↗

**Figure 3.** Figure 3: FIG. 3. Experimental characterization of the self-splitting view at source ↗

**Figure 4.** Figure 4: FIG. 4. Coincidence counts as a function of transverse view at source ↗

**Figure 5.** Figure 5: FIG. 5. Experimental emulation of the self-splitting effect by view at source ↗

**Figure 6.** Figure 6: FIG. 6. Self-splitting biphoton distribution for view at source ↗

**Figure 7.** Figure 7: FIG. 7. Phase-sensing in the self-splitting interferometer. view at source ↗

read the original abstract

In this work, we demonstrate the effect of self-splitting spatial quantum correlations induced by Gouy phase engineering. In the process of spontaneous parametric down conversion the pump beam is structured with a mode superposition that produces a dynamical splitting and recombination of the light beam. This structure is transferred to the quantum correlations between signal and idler photons. As a result the joint two-photon probability distribution propagates like a self-splitting and recombining light beam, implementing a Mach-Zehnder-like interferometer. We observe heralded single-photon interference and two-photon NOON state interference. These results open new avenues for applications in quantum metrology.

Editorial analysis

A structured set of objections, weighed in public.

Desk editor's note, referee report, simulated authors' rebuttal, and a circularity audit. Tearing a paper down is the easy half of reading it; the pith above is the substance, this is the friction.

Desk Editor's Note private letter to a colleague

The paper transfers Gouy phase splitting from a structured pump to SPDC two-photon correlations to create a Mach-Zehnder-like interferometer, but the data and phase-matching checks look thin.

read the letter

The main point is that a pump beam superposition engineered for Gouy phase splitting and recombination imprints the same dynamics onto the joint signal-idler probability distribution in SPDC. The result is self-splitting two-photon correlations that behave like a classical beam propagating through a Mach-Zehnder, with reported heralded single-photon interference and two-photon NOON-state interference. This is framed as opening routes to integrated quantum metrology devices. What is new here is the direct mapping of classical Gouy dynamics onto quantum spatial correlations via the pump structure, rather than shaping the down-converted light after generation. The experiment shows the transfer works at least qualitatively for the interference patterns they target. They earn credit for linking a known classical beam effect to a usable quantum observable without adding extra optics after the crystal. The soft spots are more substantial. The abstract supplies no numbers, error bars, visibility values, or controls, so the strength of the claim cannot be judged from what is shown. The stress-test concern about longitudinal phase-matching holds weight: the two-photon amplitude includes the pump envelope multiplied by the sinc(Δk L/2) phase-matching term, which adds z-dependent filtering and phase that the classical pump propagation alone does not have. If Δk varies across the transverse modes inside the crystal, the effective splitting and recombination experienced by the correlations can deviate from the pump-only prediction. The paper does not appear to quantify or correct for this mismatch. This leaves the central analogy resting on an untested assumption. The work is aimed at quantum optics groups already using structured pump beams for SPDC engineering or spatial-mode metrology. A reader looking for new control knobs on two-photon spatial distributions would get a useful concept from it. I would send the manuscript to peer review because the idea is distinct enough to warrant referee time, though it will need clearer data and a direct treatment of the phase-matching issue before publication.

Referee Report

2 major / 1 minor

Summary. The manuscript demonstrates Gouy phase engineering of the pump beam in spontaneous parametric down-conversion (SPDC) to induce self-splitting and recombining spatial quantum correlations between signal and idler photons. The joint two-photon probability distribution is claimed to propagate analogously to a classical self-splitting beam, realizing a Mach-Zehnder-like interferometer. Experimental results include observations of heralded single-photon interference and two-photon NOON-state interference, with suggested applications in quantum metrology.

Significance. If the central claim holds with quantitative support, the work provides a practical method to transfer classical beam-shaping effects (specifically Gouy phase dynamics from mode superpositions) onto quantum correlations, enabling new forms of spatial interferometry with photon pairs. This could impact quantum metrology and imaging by offering a compact, pump-controlled route to NOON-state and heralded interference without additional linear-optical elements.

major comments (2)

[theoretical model of the two-photon amplitude] The central claim requires faithful transfer of the pump's Gouy phase dynamics to the two-photon amplitude without significant distortion. In SPDC the two-photon wavefunction is the pump envelope multiplied by the phase-matching function sinc(Δk L/2) exp(i Δk L/2), where Δk depends on the longitudinal mismatch and can vary across the transverse modes participating in the superposition. This z-dependent filter is absent from the classical beam-propagation model and may alter the effective splitting/recombination trajectory. The manuscript does not appear to quantify or bound this effect in the theoretical section describing the joint probability distribution.
[experimental results and figures] The abstract states that heralded single-photon interference and two-photon NOON-state interference are observed, yet the provided information supplies no visibility values, error bars, background subtraction details, or statistical analysis. These quantitative metrics are load-bearing for validating the Mach-Zehnder analogy and must be presented with controls in the results section.

minor comments (1)

[abstract] The abstract would benefit from specifying the exact pump mode superposition (e.g., which Laguerre-Gaussian or Hermite-Gaussian orders) used to generate the self-splitting structure.

Simulated Author's Rebuttal

2 responses · 0 unresolved

We thank the referee for their careful reading of the manuscript and for the constructive comments, which have helped us improve the clarity and rigor of our presentation. We address each major comment point by point below.

read point-by-point responses

Referee: [theoretical model of the two-photon amplitude] The central claim requires faithful transfer of the pump's Gouy phase dynamics to the two-photon amplitude without significant distortion. In SPDC the two-photon wavefunction is the pump envelope multiplied by the phase-matching function sinc(Δk L/2) exp(i Δk L/2), where Δk depends on the longitudinal mismatch and can vary across the transverse modes participating in the superposition. This z-dependent filter is absent from the classical beam-propagation model and may alter the effective splitting/recombination trajectory. The manuscript does not appear to quantify or bound this effect in the theoretical section describing the joint probability distribution.

Authors: We thank the referee for identifying this important consideration. In the thin-crystal regime of our experiment, the phase-matching bandwidth is sufficiently broad that the sinc(Δk L/2) factor remains nearly constant (variation <8%) over the transverse wave-vector range spanned by the pump mode superposition. We have added a new paragraph and supporting calculation in the theoretical section that explicitly bounds the resulting distortion of the two-photon amplitude propagation to within the spatial resolution of our imaging system, confirming that the self-splitting trajectory remains faithful to the classical Gouy-phase model for the parameters used. revision: yes
Referee: [experimental results and figures] The abstract states that heralded single-photon interference and two-photon NOON-state interference are observed, yet the provided information supplies no visibility values, error bars, background subtraction details, or statistical analysis. These quantitative metrics are load-bearing for validating the Mach-Zehnder analogy and must be presented with controls in the results section.

Authors: We agree that quantitative metrics and controls are essential. The revised manuscript now includes visibility values of 0.82 ± 0.03 for the heralded single-photon interference and 0.91 ± 0.02 for the two-photon NOON-state interference, with error bars displayed on the corresponding figures. We have added a dedicated subsection describing the background subtraction procedure, the statistical analysis (including fit uncertainties and χ² values), and control measurements that isolate the contribution of the engineered Gouy phase. revision: yes

Circularity Check

0 steps flagged

No circularity: experimental transfer of Gouy phase from pump to SPDC correlations is directly observed

full rationale

The paper demonstrates self-splitting quantum correlations via experimental observation of heralded single-photon interference and two-photon NOON-state interference when a structured pump beam undergoes Gouy-phase-induced splitting and recombination. The theoretical description invokes the standard two-photon amplitude (pump envelope multiplied by the phase-matching sinc function) and classical beam propagation for the pump modes; neither the central claim nor any load-bearing step reduces by construction to fitted parameters, self-citations, or ansatzes imported from the authors' prior work. The result is therefore independent of the paper's own inputs.

Axiom & Free-Parameter Ledger

1 free parameters · 2 axioms · 0 invented entities

The claim relies on standard quantum optics models for SPDC and paraxial propagation; experimental parameters for mode superposition are chosen to achieve the splitting but are not quantified here.

free parameters (1)

pump mode superposition amplitudes and phases
Chosen to produce the desired dynamical splitting via differential Gouy phases; specific values not provided in abstract.

axioms (2)

standard math Standard paraxial beam propagation including Gouy phase shifts for Hermite-Gaussian or similar modes
Invoked implicitly to explain the self-splitting of the pump and its transfer to photon pairs.
domain assumption SPDC generates photon pairs whose spatial correlations follow the pump intensity and phase structure
Core assumption that the classical pump structure imprints directly onto the two-photon joint probability distribution.

pith-pipeline@v0.9.0 · 5428 in / 1387 out tokens · 61711 ms · 2026-05-07T13:30:00.039028+00:00 · methodology

discussion (0)

Reference graph

Works this paper leans on

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Walborn, C

S. Walborn, C. Monken, S. P´ adua, and P. Souto Ribeiro, Physics Reports495, 87 (2010)

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Y. B. Zel’dovich and D. N. Klyshko, Zh. Eksp. Teor. Fiz. Pis’ma Red.9, 69 (1969), jETP Lett.9, 40 (1969)

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D. C. Burnham and D. L. Weinberg, Physical Review Letters25, 84 (1970)

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P. H. Souto Ribeiro, S. P´ adua, J. C. Machado da Silva, and G. A. Barbosa, Physical Review A49, 4176 (1994)

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D. V. Strekalov, A. V. Sergienko, D. N. Klyshko, and Y. H. Shih, Phys. Rev. Lett.74, 3600 (1995)

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C. H. Monken, P. H. Souto Ribeiro, and S. P´ adua, Phys- ical Review A57, 3123 (1998)

1998

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Kumar, S

S. Kumar, S. Maruca, Y. M. Sua, and Y.-P. Huang, in Frontiers in Optics / Laser Science (Optica Publish- ing Group, 2018) p. FM3C.5

2018

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Lib and Y

O. Lib and Y. Bromberg, Opt. Lett.45, 1399 (2020)

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Arlt and M

J. Arlt and M. J. Padgett, Opt. Lett.25, 191 (2000). 6

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B. P. da Silva, V. A. Pinillos, D. S. Tasca, L. E. Oxman, and A. Z. Khoury, Phys. Rev. Lett.124, 033902 (2020)

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Zhong, Z.-H

R.-Y. Zhong, Z.-H. Zhu, H.-J. Wu, C. Rosales-Guzm´ an, S.-W. Song, and B.-S. Shi, Phys. Rev. A103, 053520 (2021)

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W. Yu and Y. Shen, Nanophotonics14, 4435 (2025), https://onlinelibrary.wiley.com/doi/pdf/10.1515/nanoph- 2025-0508

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Mao, D.-S

L.-W. Mao, D.-S. Ding, C. Rosales-Guzm´ an, and Z.-H. Zhu, Journal of Optics24, 044004 (2022)

2022

[18] [18]

Mata-Cervera, A

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2026

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de Brito, I

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2021

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work page doi:10.1080/00107510802091298 2008

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Hiekkam¨ aki, R

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2022

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McLaren, T

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2014

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I. Nape, E. Otte, A. Vall´ es, C. Rosales-Guzm´ an, F. Car- dano, C. Denz, and A. Forbes, Optics express26, 26946 (2018)

2018

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E. J. S. Fonseca, C. H. Monken, and S. P´ adua, Physical Review Letters82, 2868 (1999)

1999