Vacuum Fluctuation-Induced State Switching in Degenerate Optical Parametric Oscillators

Charles Roques-Carmes; Jamison Sloan; Marin Solja\v{c}i\'c; Michael Horodynski; Rom Simovitch; Seou Choi; Yannick Salamin; Yihao Huang

arxiv: 2606.28178 · v1 · pith:AGZBKDRRnew · submitted 2026-06-26 · 🪐 quant-ph · physics.optics

Vacuum Fluctuation-Induced State Switching in Degenerate Optical Parametric Oscillators

Yihao Huang , Seou Choi , Rom Simovitch , Jamison Sloan , Charles Roques-Carmes , Michael Horodynski , Marin Solja\v{c}i\'c , Yannick Salamin This is my paper

Pith reviewed 2026-06-29 03:44 UTC · model grok-4.3

classification 🪐 quant-ph physics.optics

keywords optical parametric oscillatorvacuum fluctuationsstate switchingbistabilityquantum noisemetapotentialbias injectionswitching time

0 comments

The pith

An external bias field controls vacuum fluctuation-driven switching between steady states in a degenerate optical parametric oscillator by reshaping its metapotential.

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

This paper examines how quantum vacuum fluctuations trigger transitions between the two stable states of a driven-dissipative optical parametric oscillator near its bifurcation. It demonstrates that an injected bias field can reshape the effective metapotential that governs these states, thereby tuning the average time between switches. Analytical formulas for the mean switching time are obtained from the semiclassical noise model and confirmed by direct simulations of the field statistics and probability currents. The dependence of switching on bias amplitude, pump level, and nonlinearity is mapped out to show how microscopic quantum noise can be harnessed for macroscopic control.

Core claim

In a biased degenerate OPO, vacuum fluctuations induce noise-activated switching between the two steady states; an external bias field modifies the shape of the steady-state metapotential, yielding closed-form expressions for the mean switching time that match numerical simulations of the intracavity field distribution and inter-state flow.

What carries the argument

The OPO steady-state metapotential, whose barrier height and asymmetry are tuned by the external bias to set the rate of vacuum-induced escapes between the two attractors.

If this is right

Switching rate becomes a controllable function of the injected bias amplitude.
Average transition time scales with pump gain and optical nonlinearity according to the explicit formulas.
The bias-tuned metapotential supplies a mechanism for noise-assisted state selection in photonic circuits.
The same framework supplies design rules for probabilistic gates that rely on vacuum-induced transitions.

Where Pith is reading between the lines

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

Similar bias control of fluctuation-driven switching could be tested in other near-bifurcation nonlinear resonators such as Kerr microcavities.
The derived switching-time expressions may serve as a starting point for engineering optical memory elements whose retention time is set by quantum noise rather than thermal activation.
Integration with waveguide platforms would allow the bias field to be applied locally, opening routes to arrays of coupled OPOs with programmable noise-assisted dynamics.

Load-bearing premise

The operating point remains close enough to the bifurcation that the metapotential picture and semiclassical noise description continue to apply once the bias field is introduced.

What would settle it

Measured average switching times that depart systematically from the derived analytical expressions once the bias strength pushes the system appreciably away from the bifurcation point.

Figures

Figures reproduced from arXiv: 2606.28178 by Charles Roques-Carmes, Jamison Sloan, Marin Solja\v{c}i\'c, Michael Horodynski, Rom Simovitch, Seou Choi, Yannick Salamin, Yihao Huang.

**Figure 2.** Figure 2: FIG. 2 [PITH_FULL_IMAGE:figures/full_fig_p003_2.png] view at source ↗

**Figure 3.** Figure 3: FIG. 3 [PITH_FULL_IMAGE:figures/full_fig_p003_3.png] view at source ↗

**Figure 4.** Figure 4: (c) illustrates the switching probability P(α (1)) as a function of the bias pulse’s peak amplitude b and standard deviation σb. The standard deviation σb is normalized to the cavity lifetime. As expected, the switching probability increases monotonically with both the amplitude and the duration of the bias pulse. Notably, for a fixed peak amplitude b, the switching probability P(α (1)) changes rapidly a… view at source ↗

read the original abstract

Bistable driven-dissipative systems near bifurcations can exhibit noise-activated switching between steady states. Here, we investigate how quantum vacuum fluctuations induce such switching in a biased optical parametric oscillator (OPO), a nonlinear system with intrinsic bistability. We show how microscopic quantum fluctuations driving macroscopic transitions can be controlled with an external bias field that reshapes the OPO steady-state metapotential. We derive analytical expressions for the average switching time and validate them through simulations of the OPO field distribution and inter-state probability flow under bias injection. We further examine how switching depends on bias strength, pump gain, and optical nonlinearity. Our findings clarify how quantum noise can shape macroscopic dynamics and provide a foundation for noise-assisted photonic machine learning and probabilistic quantum gates.

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 gives analytical switching times for bias-tuned vacuum-fluctuation transitions in OPOs and backs them with simulations, but the metapotential approximation's regime under bias is not explicitly verified.

read the letter

The core contribution is taking the standard picture of noise-driven switching near a pitchfork in driven-dissipative systems and working it out for a biased degenerate OPO. They reshape the effective potential with an external bias, derive closed-form expressions for the mean switching time, and compare them to numerical runs that track the field distribution and the probability current between the two states. That combination of bias control plus vacuum-fluctuation activation in this platform is the concrete step forward.

The simulations appear to reproduce the analytic trends across bias strength, pump gain, and nonlinearity, which is useful for anyone who wants a handle on how to steer the switching rate. The dependence plots give a practical map that prior abstract treatments of bistable OPOs did not supply.

The main gap is the one flagged in the stress test. The derivations rest on the system staying close enough to the bifurcation that the semiclassical metapotential and noise spectrum remain accurate once the bias is turned on. Nothing in the abstract or the available description shows a direct check—such as computed distance to the bifurcation point or a comparison of the actual noise correlators against the assumed form. If the full text contains that diagnostic for the parameter ranges they simulate, the claim is on firmer ground; if not, the analytic expressions could be extrapolating outside their stated regime.

The work is aimed at people already thinking about probabilistic photonic gates or noise-assisted computing in nonlinear optics. A reader who needs switching-time estimates in biased OPOs will find usable expressions and scaling trends. It is solid enough on its own terms to warrant referee time, provided the validity checks are either present or added.

Referee Report

1 major / 0 minor

Summary. The paper claims that quantum vacuum fluctuations induce noise-activated switching between bistable states in a biased degenerate optical parametric oscillator (OPO). An external bias field is shown to control these transitions by reshaping the steady-state metapotential; analytical expressions for the average switching time are derived from a semiclassical noise model and validated via simulations of the OPO field distribution and inter-state probability flow. Dependence on bias strength, pump gain, and nonlinearity is examined, with implications for photonic machine learning and probabilistic quantum gates.

Significance. If the metapotential-based derivations and their regime of validity hold, the work would provide a concrete link between microscopic quantum noise and controllable macroscopic switching in driven-dissipative systems, offering analytical tools rather than purely numerical results. The combination of closed-form switching-time expressions with simulation validation is a positive feature.

major comments (1)

[Derivations and simulation setup (implicit throughout)] The derivation of analytical switching times and the simulation validation both rest on the assumption that the driven OPO remains sufficiently close to the pitchfork bifurcation for the metapotential description and semiclassical noise model to remain accurate under nonzero bias injection. No diagnostic (e.g., computed distance to bifurcation, comparison of noise correlators before/after bias, or explicit bounds on bias strength relative to the critical pump) is reported to confirm this regime for the parameter values examined. This assumption is load-bearing for the central claim.

Simulated Author's Rebuttal

1 responses · 0 unresolved

We thank the referee for their thorough review and valuable feedback on our manuscript. We address the major comment regarding the validation of the metapotential approximation under bias injection below.

read point-by-point responses

Referee: [Derivations and simulation setup (implicit throughout)] The derivation of analytical switching times and the simulation validation both rest on the assumption that the driven OPO remains sufficiently close to the pitchfork bifurcation for the metapotential description and semiclassical noise model to remain accurate under nonzero bias injection. No diagnostic (e.g., computed distance to bifurcation, comparison of noise correlators before/after bias, or explicit bounds on bias strength relative to the critical pump) is reported to confirm this regime for the parameter values examined. This assumption is load-bearing for the central claim.

Authors: We agree that providing explicit diagnostics would better substantiate the regime of validity. Our parameter choices ensure the system operates near the bifurcation even with bias, as the bias is introduced as a small perturbation that reshapes the metapotential without driving the system far from the critical point; this is implicitly supported by the close agreement between our analytical predictions and numerical simulations across the examined ranges. Nevertheless, to fully address the concern, we will revise the manuscript to include: computed distances to the bifurcation point for biased cases, explicit bounds on allowable bias strength relative to the critical pump, and comparisons of noise correlators with and without bias. These additions will confirm the applicability of the semiclassical model. revision: yes

Circularity Check

0 steps flagged

No circularity; derivation chain self-contained

full rationale

The abstract states that analytical expressions for average switching time are derived from the bias-reshaped metapotential and validated by independent simulations of field distribution and probability flow. No self-citations, fitted parameters renamed as predictions, or self-definitional reductions are present in the provided text. The central claim rests on standard semiclassical noise modeling near bifurcations, which is externally falsifiable and does not reduce to its own inputs by construction. This matches the expected non-circular case for a first-principles quantum-optics derivation.

Axiom & Free-Parameter Ledger

0 free parameters · 0 axioms · 0 invented entities

Abstract-only review supplies no explicit free parameters, axioms, or invented entities; ledger left empty.

pith-pipeline@v0.9.1-grok · 5684 in / 1019 out tokens · 27615 ms · 2026-06-29T03:44:33.552037+00:00 · methodology

discussion (0)

Reference graph

Works this paper leans on

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Asymmetry control in a parametric oscillator for the quantum simulation of chemical activation.PRX Quantum, 7(2):020309, 2026

Alejandro Cros Carrillo de Albornoz, Rodrigo G Corti ˜nas, Max Sch¨afer, Nicholas E Frattini, Brandon Allen, Delmar GA Cabral, Pablo E Videla, Pouya Khazaei, Eitan Geva, Victor S Batista, et al. Asymmetry control in a parametric oscillator for the quantum simulation of chemical activation.PRX Quantum, 7(2):020309, 2026

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Bi- asing the quantum vacuum to control macroscopic probability distributions.Science, 381(6654):205–209, 2023

Charles Roques-Carmes, Yannick Salamin, Jamison Sloan, Seou Choi, Gustavo Velez, Ethan Koskas, Nicholas Rivera, Steven E Kooi, John D Joannopoulos, and Marin Solja ˇci´c. Bi- asing the quantum vacuum to control macroscopic probability distributions.Science, 381(6654):205–209, 2023

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2021
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P- bits for probabilistic spin logic.Applied Physics Reviews, 6(1), 2019

Kerem Y Camsari, Brian M Sutton, and Supriyo Datta. P- bits for probabilistic spin logic.Applied Physics Reviews, 6(1), 2019

2019
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Collective and synchronous dynamics of photonic spiking neurons.Nature Communications, 12(1):2325, 2021

Takahiro Inagaki, Kensuke Inaba, Timoth ´ee Leleu, Toshimori Honjo, Takuya Ikuta, Koji Enbutsu, Takeshi Umeki, Ryoichi Kasahara, Kazuyuki Aihara, and Hiroki Takesue. Collective and synchronous dynamics of photonic spiking neurons.Nature Communications, 12(1):2325, 2021

2021
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Photonic proba- bilistic machine learning using quantum vacuum noise.Nature Communications, 15(1):7760, 2024

Seou Choi, Yannick Salamin, Charles Roques-Carmes, Rumen Dangovski, Di Luo, Zhuo Chen, Michael Horodynski, Jamison Sloan, Shiekh Zia Uddin, and Marin Solja ˇci´c. Photonic proba- bilistic machine learning using quantum vacuum noise.Nature Communications, 15(1):7760, 2024

2024
[23]

Stochastic logic in biased coupled photonic proba- bilistic bits.Communications Physics, 8(1):31, 2025

Michael Horodynski, Charles Roques-Carmes, Yannick Salamin, Seou Choi, Jamison Sloan, Di Luo, and Marin Soljaˇci´c. Stochastic logic in biased coupled photonic proba- bilistic bits.Communications Physics, 8(1):31, 2025

2025
[24]

Pho- tonic integrated circuit optical parametric oscillators.Optica, 13(1):11–30, 2025

Xiyuan Lu, Robert M Gray, Jordan Stone, Selina Zhou, Nico- las Englebert, Alireza Marandi, and Kartik Srinivasan. Pho- tonic integrated circuit optical parametric oscillators.Optica, 13(1):11–30, 2025

2025
[25]

Quantum sensitivity of paramet- ric oscillators.Physical Review Research, 7(2):L022056, 2025

Alex Gu, Jamison Sloan, Charles Roques-Carmes, Seou Choi, Eric I Rosenthal, Michael Horodynski, Yannick Salamin, Jelena Vuˇckovi´c, and Marin Soljaˇci´c. Quantum sensitivity of paramet- ric oscillators.Physical Review Research, 7(2):L022056, 2025

2025

[1] [1]

Brownian motion in a field of force and the diffusion model of chemical reactions.Physica, 7(4):284–304, 1940

Hendrik Anthony Kramers. Brownian motion in a field of force and the diffusion model of chemical reactions.Physica, 7(4):284–304, 1940

1940

[2] [2]

Reaction- rate theory: fifty years after Kramers.Reviews of Modern Physics, 62(2):251, 1990

Peter H ¨anggi, Peter Talkner, and Michal Borkovec. Reaction- rate theory: fifty years after Kramers.Reviews of Modern Physics, 62(2):251, 1990

1990

[3] [3]

Stochastic phase switch- ing of a parametrically driven electron in a penning trap.Phys- ical Review Letters, 83(5):899, 1999

LJ Lapidus, D Enzer, and G Gabrielse. Stochastic phase switch- ing of a parametrically driven electron in a penning trap.Phys- ical Review Letters, 83(5):899, 1999

1999

[4] [4]

Activation barrier scaling and crossover for noise-induced switching in micromechanical parametric oscillators.Physical Review Letters, 99(6):060601, 2007

HB Chan and C Stambaugh. Activation barrier scaling and crossover for noise-induced switching in micromechanical parametric oscillators.Physical Review Letters, 99(6):060601, 2007. 6

2007

[5] [5]

Implementing p-bits with embedded mtj.IEEE Electron Device Letters, 38(12):1767–1770, 2017

Kerem Yunus Camsari, Sayeef Salahuddin, and Supriyo Datta. Implementing p-bits with embedded mtj.IEEE Electron Device Letters, 38(12):1767–1770, 2017

2017

[6] [6]

Neurobiological models of two-choice decision making can be reduced to a one- dimensional nonlinear diffusion equation.PLoS Computational Biology, 4(3):e1000046, 2008

Alex Roxin and Anders Ledberg. Neurobiological models of two-choice decision making can be reduced to a one- dimensional nonlinear diffusion equation.PLoS Computational Biology, 4(3):e1000046, 2008

2008

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Balance between noise and adaptation in competi- tion models of perceptual bistability.Journal of Computational Neuroscience, 27(1):37–54, 2009

Asya Shpiro, Ruben Moreno-Bote, Nava Rubin, and John Rinzel. Balance between noise and adaptation in competi- tion models of perceptual bistability.Journal of Computational Neuroscience, 27(1):37–54, 2009

2009

[8] [8]

Rf-driven josephson bifurcation amplifier for quantum measurement.Physical re- view letters, 93(20):207002, 2004

Irfan Siddiqi, R Vijay, F Pierre, CM Wilson, M Metcalfe, C Rigetti, L Frunzio, and MH Devoret. Rf-driven josephson bifurcation amplifier for quantum measurement.Physical re- view letters, 93(20):207002, 2004

2004

[9] [9]

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William A Borders, Ahmed Z Pervaiz, Shunsuke Fukami, Kerem Y Camsari, Hideo Ohno, and Supriyo Datta. Integer factorization using stochastic magnetic tunnel junctions.Na- ture, 573(7774):390–393, 2019

2019

[10] [10]

Hardware-aware in situ learning based on stochastic magnetic tunnel junctions

Jan Kaiser, William A Borders, Kerem Y Camsari, Shunsuke Fukami, Hideo Ohno, and Supriyo Datta. Hardware-aware in situ learning based on stochastic magnetic tunnel junctions. Physical Review Applied, 17(1):014016, 2022

2022

[11] [11]

Fluctuational phase-flip transitions in parametrically driven oscillators.Physical Review E, 57(5):5202, 1998

MI Dykman, CM Maloney, VN Smelyanskiy, and M Silver- stein. Fluctuational phase-flip transitions in parametrically driven oscillators.Physical Review E, 57(5):5202, 1998

1998

[12] [12]

Switching via quantum activa- tion: A parametrically modulated oscillator.Physical Review A, 73(4):042108, 2006

M Marthaler and MI Dykman. Switching via quantum activa- tion: A parametrically modulated oscillator.Physical Review A, 73(4):042108, 2006

2006

[13] [13]

Resonant-force-induced symmetry breaking in a quantum para- metric oscillator.Physical Review Research, 6(3):033240, 2024

Daniel KJ Boneß, Wolfgang Belzig, and Mark I Dykman. Resonant-force-induced symmetry breaking in a quantum para- metric oscillator.Physical Review Research, 6(3):033240, 2024

2024

[14] [14]

Unraveling the switching dynamics in a quan- tum double-well potential.Physical Review A, 112(4):042202, 2025

Qile Su, Rodrigo G Corti ˜nas, Jayameenakshi Venkatraman, and Shruti Puri. Unraveling the switching dynamics in a quan- tum double-well potential.Physical Review A, 112(4):042202, 2025

2025

[15] [15]

Quantum versus classical switching dynamics of driven dissi- pative kerr resonators.Physical Review Applied, 13(4):044017, 2020

Christian Kraglund Andersen, Archana Kamal, Nicholas A Masluk, Ioan M Pop, Alexandre Blais, and Michel H Devoret. Quantum versus classical switching dynamics of driven dissi- pative kerr resonators.Physical Review Applied, 13(4):044017, 2020

2020

[16] [16]

Asymmetry control in a parametric oscillator for the quantum simulation of chemical activation.PRX Quantum, 7(2):020309, 2026

Alejandro Cros Carrillo de Albornoz, Rodrigo G Corti ˜nas, Max Sch¨afer, Nicholas E Frattini, Brandon Allen, Delmar GA Cabral, Pablo E Videla, Pouya Khazaei, Eitan Geva, Victor S Batista, et al. Asymmetry control in a parametric oscillator for the quantum simulation of chemical activation.PRX Quantum, 7(2):020309, 2026

2026

[17] [17]

Bi- asing the quantum vacuum to control macroscopic probability distributions.Science, 381(6654):205–209, 2023

Charles Roques-Carmes, Yannick Salamin, Jamison Sloan, Seou Choi, Gustavo Velez, Ethan Koskas, Nicholas Rivera, Steven E Kooi, John D Joannopoulos, and Marin Solja ˇci´c. Bi- asing the quantum vacuum to control macroscopic probability distributions.Science, 381(6654):205–209, 2023

2023

[18] [18]

Springer Science & Business Media, 2007

Howard J Carmichael.Statistical methods in quantum optics 2: Non-classical fields. Springer Science & Business Media, 2007

2007

[19] [19]

Probabilistic computing with p- bits.Applied Physics Letters, 119(15), 2021

Jan Kaiser and Supriyo Datta. Probabilistic computing with p- bits.Applied Physics Letters, 119(15), 2021

2021

[20] [20]

P- bits for probabilistic spin logic.Applied Physics Reviews, 6(1), 2019

Kerem Y Camsari, Brian M Sutton, and Supriyo Datta. P- bits for probabilistic spin logic.Applied Physics Reviews, 6(1), 2019

2019

[21] [21]

Collective and synchronous dynamics of photonic spiking neurons.Nature Communications, 12(1):2325, 2021

Takahiro Inagaki, Kensuke Inaba, Timoth ´ee Leleu, Toshimori Honjo, Takuya Ikuta, Koji Enbutsu, Takeshi Umeki, Ryoichi Kasahara, Kazuyuki Aihara, and Hiroki Takesue. Collective and synchronous dynamics of photonic spiking neurons.Nature Communications, 12(1):2325, 2021

2021

[22] [22]

Photonic proba- bilistic machine learning using quantum vacuum noise.Nature Communications, 15(1):7760, 2024

Seou Choi, Yannick Salamin, Charles Roques-Carmes, Rumen Dangovski, Di Luo, Zhuo Chen, Michael Horodynski, Jamison Sloan, Shiekh Zia Uddin, and Marin Solja ˇci´c. Photonic proba- bilistic machine learning using quantum vacuum noise.Nature Communications, 15(1):7760, 2024

2024

[23] [23]

Stochastic logic in biased coupled photonic proba- bilistic bits.Communications Physics, 8(1):31, 2025

Michael Horodynski, Charles Roques-Carmes, Yannick Salamin, Seou Choi, Jamison Sloan, Di Luo, and Marin Soljaˇci´c. Stochastic logic in biased coupled photonic proba- bilistic bits.Communications Physics, 8(1):31, 2025

2025

[24] [24]

Pho- tonic integrated circuit optical parametric oscillators.Optica, 13(1):11–30, 2025

Xiyuan Lu, Robert M Gray, Jordan Stone, Selina Zhou, Nico- las Englebert, Alireza Marandi, and Kartik Srinivasan. Pho- tonic integrated circuit optical parametric oscillators.Optica, 13(1):11–30, 2025

2025

[25] [25]

Quantum sensitivity of paramet- ric oscillators.Physical Review Research, 7(2):L022056, 2025

Alex Gu, Jamison Sloan, Charles Roques-Carmes, Seou Choi, Eric I Rosenthal, Michael Horodynski, Yannick Salamin, Jelena Vuˇckovi´c, and Marin Soljaˇci´c. Quantum sensitivity of paramet- ric oscillators.Physical Review Research, 7(2):L022056, 2025

2025