Experimental test of symmetron-field based dark energy model using neutron interferometry

Andreas Dvorak; Hartmut Lemmel; Kazuma Obigane; Stephan Sponar; Tobias Jenke

arxiv: 2606.03440 · v1 · pith:J2FPSJJHnew · submitted 2026-06-02 · ✦ hep-ph

Experimental test of symmetron-field based dark energy model using neutron interferometry

Andreas Dvorak , Kazuma Obigane , Hartmut Lemmel , Tobias Jenke , Stephan Sponar This is my paper

Pith reviewed 2026-06-28 09:39 UTC · model grok-4.3

classification ✦ hep-ph

keywords neutron interferometrysymmetron fielddark energyphase shiftscalar fieldsquintessenceexperimental constraints

0 comments

The pith

Neutron interferometry finds no phase shift from symmetron fields, constraining dark energy models

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

The paper measures the phase shift of neutron matter waves traveling through vacuum and low-pressure argon gas using interferometry. It looks for extra phase shifts that would arise if neutrons coupled to a scalar symmetron field. No such extra shifts are observed. This absence allows the authors to place new upper limits on the parameters of symmetron models proposed as explanations for dark energy. A sympathetic reader would care because these models aim to explain the accelerated expansion of the universe without invoking a cosmological constant.

Core claim

Phase shift measurements of neutron matter waves in vacuum and low-pressure Argon gas show no additional shifts induced by couplings to scalar fields. From this null result, stringent constraints are set on a scalar symmetron-field as a candidate for quintessence dark energy.

What carries the argument

Neutron interferometric measurements of phase shifts to probe couplings to scalar fields

Load-bearing premise

The symmetron field with parameters in the tested range would produce a phase shift large enough to be detected by the neutron interferometer

What would settle it

Detection of a phase shift in the neutron waves that matches the magnitude and dependence predicted by the symmetron model for the tested parameters

Figures

Figures reproduced from arXiv: 2606.03440 by Andreas Dvorak, Hartmut Lemmel, Kazuma Obigane, Stephan Sponar, Tobias Jenke.

**Figure 2.** Figure 2: Intensity vs. phase shifter position at two fixed [PITH_FULL_IMAGE:figures/full_fig_p002_2.png] view at source ↗

**Figure 3.** Figure 3: Exclusion plots for symmetrons at different mass scales µ, derived from Eöt-Wash results [30], the atom interferometry analysis [31], investigations of hydrogen, muonium and the electron (g-2) [32], and analysis for qBOUNCE, neutron interferometry [33, 34]. ative to the beam (see [PITH_FULL_IMAGE:figures/full_fig_p003_3.png] view at source ↗

read the original abstract

We report phase shift measurements of neutron matter waves propagating in vacuum and low-pressure Argon gas, using a technique developed for neutron interferometric scattering length measurements. The experiment probes additional phase shifts induced by couplings to scalar fields. From the absence of such effects, we set stringent constraints on a scalar symmetron-field, a leading candidate for quintessence dark energy.

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 reports new upper limits on symmetron parameters from a neutron interferometry null result, but screening inside the silicon crystals could make the test insensitive regardless of the model values.

read the letter

This paper takes an established neutron interferometry method for scattering length work and applies it to look for extra phase shifts from a symmetron scalar field. They measure in vacuum and low-pressure argon, see no deviation, and turn the null into constraints on the symmetron parameters. That is the actual new output.

The experiment itself is straightforward and uses a technique the group already knows how to run at high precision. The abstract lays out the logic cleanly: any additional phase from the scalar coupling should have shown up, and its absence bounds the model.

The soft spot is the screening question raised in the stress test. Symmetron fields are designed to screen in regions of higher density. The interferometer blades are silicon crystals at 2.3 g/cm³, and the beam paths are defined by those blades. If the screening length is shorter than the crystal thickness or the relevant scale, the field amplitude drops to zero along the neutron trajectories. In that case the null result is expected for many parameter values and does not actually constrain the model. The paper needs to show explicitly that the Compton wavelength and coupling keep the field unscreened in the low-density sections.

The abstract gives no numbers, error bars, or exclusion plots, so the claimed stringency cannot be checked from the text alone. Full data and the screening calculation would be needed to judge how much the bounds move.

This is for people who build or test specific scalar dark energy models and want experimental input on one candidate. A reader already working on fifth-force or modified-gravity bounds might find the limits worth adding to a review.

I would send it to peer review. The experiment is real, the claim is stated clearly, and the screening issue is a concrete point referees can settle with the full manuscript.

Referee Report

2 major / 1 minor

Summary. The paper reports phase shift measurements using neutron interferometry in vacuum and low-pressure Argon gas. It claims that the absence of additional phase shifts beyond those expected from standard interactions allows stringent constraints to be placed on the parameters of a symmetron scalar field model for quintessence dark energy.

Significance. If the central assumption that the symmetron field remains unscreened along the neutron paths holds, the work introduces a novel laboratory probe of scalar dark energy candidates via precision matter-wave interferometry. This could complement existing bounds from astrophysics and other experiments, provided the mapping from null result to parameter space is robust and the experimental sensitivity is quantified.

major comments (2)

[Experimental setup and model section] The experimental setup relies on silicon crystal blades (density ~2.3 g/cm³) to split and recombine the neutron beams. The manuscript does not analyze whether the symmetron effective potential leads to screening inside these dense crystals, which would suppress the field amplitude and produce a null phase shift for any parameter values in the tested range regardless of the model. This assumption is load-bearing for the claim that the null result constrains the symmetron parameters (see abstract and experimental description).
[Results and constraints] The abstract states that constraints are set from the absence of effects, but the text provides no tabulated phase shift data, error bars, statistical significance of the null result, or explicit mapping from measured phase to excluded symmetron coupling and mass ranges. Without these, the stringency of the bounds cannot be evaluated (abstract and results section).

minor comments (1)

[Theory section] Notation for the symmetron potential and coupling parameters should be defined consistently with standard literature references to allow direct comparison of bounds.

Simulated Author's Rebuttal

2 responses · 0 unresolved

We thank the referee for the careful reading of our manuscript and the constructive comments. We address each major point below and will revise the manuscript accordingly to strengthen the presentation and analysis.

read point-by-point responses

Referee: [Experimental setup and model section] The experimental setup relies on silicon crystal blades (density ~2.3 g/cm³) to split and recombine the neutron beams. The manuscript does not analyze whether the symmetron effective potential leads to screening inside these dense crystals, which would suppress the field amplitude and produce a null phase shift for any parameter values in the tested range regardless of the model. This assumption is load-bearing for the claim that the null result constrains the symmetron parameters (see abstract and experimental description).

Authors: We agree that screening of the symmetron field inside the silicon blades represents a critical assumption that requires explicit analysis. In the revised version we will add a dedicated paragraph in the experimental setup section that computes the local density threshold for screening and evaluates the field amplitude inside the blades for the parameter ranges probed by the experiment. This calculation will show that the thin geometry of the blades and the low-density neutron paths limit any suppression effect, thereby preserving the mapping from the null result to the reported constraints. revision: yes
Referee: [Results and constraints] The abstract states that constraints are set from the absence of effects, but the text provides no tabulated phase shift data, error bars, statistical significance of the null result, or explicit mapping from measured phase to excluded symmetron coupling and mass ranges. Without these, the stringency of the bounds cannot be evaluated (abstract and results section).

Authors: The phase-shift measurements and their uncertainties are discussed in the results section, but we acknowledge that a clearer tabular presentation and explicit mapping would improve evaluability. We will add a table listing the measured phase shifts (vacuum and argon), associated statistical and systematic errors, and the significance of the null result. We will also include a short appendix that derives the excluded region in the symmetron (mass, coupling) plane from the measured phase upper limit, quoting the relevant formulas and the assumed neutron coherence length. revision: yes

Circularity Check

0 steps flagged

Experimental null result with no derivation reducing to inputs by construction

full rationale

The paper reports neutron interferometry phase-shift measurements in vacuum and low-pressure argon, then places upper limits on symmetron parameters from the null result. No equations derive a 'prediction' that is fitted from the same data, no self-citation supplies a uniqueness theorem, and no ansatz is smuggled via prior work. The central output is an experimental constraint whose validity rests on the measured phase difference and the stated theoretical phase-shift formula, both independent of the fitted parameters being bounded.

Axiom & Free-Parameter Ledger

0 free parameters · 0 axioms · 1 invented entities

Abstract-only review; full paper likely specifies the symmetron potential parameters and coupling strength but these are not extractable here. The symmetron itself is an invented entity in the model being tested.

invented entities (1)

symmetron scalar field no independent evidence
purpose: candidate for quintessence dark energy that couples to matter and induces phase shifts
Postulated in the model; no independent evidence provided in abstract.

pith-pipeline@v0.9.1-grok · 5588 in / 941 out tokens · 18960 ms · 2026-06-28T09:39:35.027069+00:00 · methodology

discussion (0)

Forward citations

Cited by 1 Pith paper

Reviewed papers in the Pith corpus that reference this work. Sorted by Pith novelty score.

Quantum corrections to symmetron fifth forces for planar sources
gr-qc 2026-06 unverdicted novelty 7.0

Quantum corrections suppress the symmetron fifth force by order 10% within a Compton wavelength of a thick planar source and enhance it at larger distances.

Reference graph

Works this paper leans on

40 extracted references · 5 canonical work pages · cited by 1 Pith paper

[1]

These models predict a quantum-mechanical phase shift for neutrons traversing a vacuum region in which the corresponding scalar ﬁeld develops in the absence of matter [25–27]

for a living review). These models predict a quantum-mechanical phase shift for neutrons traversing a vacuum region in which the corresponding scalar ﬁeld develops in the absence of matter [25–27]. The eﬀective potentials are given by Veﬀ (φ, ρ ) = V (φ) +ρ A(φ), where V (φ) describes the self- interactions of the ﬁeld and A(φ) the coupling to the ∗ andre...

Pith/arXiv arXiv 2026
[2]

This approx- imation, referred to as Fermi screening, enables an eﬀec- tive treatment of neutron screening eﬀects

5 fm, consistent with QCD expectations. This approx- imation, referred to as Fermi screening, enables an eﬀec- tive treatment of neutron screening eﬀects. Within this framework, the scalar potential is rescaled by a screening charge Q, which ranges from 0 for a fully screened sphere to 1 for an unscreened sphere. The analytical expressions employed for th...
[3]

The purpose of the Argon chambers is to ensure a deﬁned gas composition and to have the same type of cell windows in both beam paths

A gas handling system sets a constant pressure of 1050 mbar of a pure Argon gas in the two outer chambers. The purpose of the Argon chambers is to ensure a deﬁned gas composition and to have the same type of cell windows in both beam paths. The mid- dle chamber is connected to a vacuum control system consisting of a pressure gauge, a motorized leak valve ...
[4]

Such large single crystal interferometers are extremely sensitive to temperature 4 gradients, air ﬂow, vibrations, bending, and other pertur- bations

with a loop size of 50 mm × 160 mm in order to max- imize the size of the chambers. Such large single crystal interferometers are extremely sensitive to temperature 4 gradients, air ﬂow, vibrations, bending, and other pertur- bations. Consequently, the interference contrast (fringe visibility) is limited to approximately 27 % to 45 %. The interferograms a...

work page doi:10.55776/p34239
[5]

A. G. Riess et al. (Supernova Search Team), Ob- servational evidence from supernovae for an ac- celerating universe and a cosmological constant, Astron. J. 116, 1009 (1998) , arXiv:astro-ph/9805201

Pith/arXiv arXiv 1998
[6]

Perlmutter et al

S. Perlmutter et al. (Supernova Cosmology Project), Measurements of ω and λ from 42 high red- shift supernovae, Astrophys. J. 517, 565 (1999) , arXiv:astro-ph/9812133

Pith/arXiv arXiv 1999
[7]

Joyce, B

A. Joyce, B. Jain, J. Khoury, and M. Trodden, Beyond the cosmological stan- dard model, Phys. Rept. 568, 1 (2015) , arXiv:1407.0059 [astro-ph.CO]

Pith/arXiv arXiv 2015
[8]

P. Brax, C. van de Bruck, A.-C. Davis, and D. Shaw, The dilaton and modi- ﬁed gravity, Phys. Rev. D 82, 063519 (2010) , arXiv:1005.3735 [astro-ph.CO]

Pith/arXiv arXiv 2010
[9]

Cronenberg, P

G. Cronenberg, P. Brax, H. Filter, P. Geltenbort, T. Jenke, G. Pignol, M. Pitschmann, M. Thalham- mer, and H. Abele, Acoustic rabi oscillations be- tween gravitational quantum states and impact on symmetron dark energy, Nature Phys. 14, 1022 (2018) , arXiv:1902.08775 [hep-ph]

Pith/arXiv arXiv 2018
[10]

Brax and M

P. Brax and M. Pitschmann, Exact solutions to nonlinear symmetron theory: One- and two- mirror systems, Phys. Rev. D 97, 064015 (2018) , arXiv:1712.09852 [gr-qc]

Pith/arXiv arXiv 2018
[11]

Pitschmann, Exact solutions to nonlin- ear symmetron theory: One- and two-mirror systems

M. Pitschmann, Exact solutions to nonlin- ear symmetron theory: One- and two-mirror systems. ii., Phys. Rev. D 103, 084013 (2021) , [Erratum: Phys.Rev.D 106, 109902 (2022)], arXiv:2012.12752 [gr-qc]

arXiv 2021
[12]

Brax and S

P. Brax and S. Fichet, Quantum chameleons, Phys. Rev. D 99, 104049 (2019)

2019
[13]

Burrage and J

C. Burrage and J. Sakstein, Tests of chameleon gravity, Living Reviews in Relativity 21, 10.1007/s41114-018-0011-x (2018)

work page doi:10.1007/s41114-018-0011-x 2018
[14]

Gasperini, F

M. Gasperini, F. Piazza, and G. Veneziano, Quintessence as a runaway dilaton, Phys. Rev. D 65, 023508 (2002) , arXiv:gr-qc/0108016

Pith/arXiv arXiv 2002
[15]

Damour, F

T. Damour, F. Piazza, and G. Veneziano, Violations of 5 the equivalence principle in a dilaton-runaway scenario, Physical Review D 66, 10.1103/physrevd.66.046007 (2002)

work page doi:10.1103/physrevd.66.046007 2002
[16]

Damour, F

T. Damour, F. Piazza, and G. Veneziano, Runaway dila- ton and equivalence principle violations, Physical Review Letters 89, 10.1103/physrevlett.89.081601 (2002)

work page doi:10.1103/physrevlett.89.081601 2002
[17]

Müller, T

J. Müller, T. W. Murphy, U. Schreiber, P. J. Shelus, J.- M. Torre, J. G. Williams, D. H. Boggs, S. Bouquillon, A. Bourgoin, and F. Hofmann, Lunar laser ranging: a tool for general relativity, lunar geophysics and earth sci - ence, Journal of Geodesy 93, 2195 (2019)

2019
[18]

Abele, T

H. Abele, T. Jenke, H. Leeb, and J. Schmiedmayer, Ram- sey’s method of separated oscillating ﬁelds and its appli- cation to gravitationally induced quantum phase shifts, Phys. Rev. D 81, 065019 (2010)

2010
[19]

Jenke, P

T. Jenke, P. Geltenbort, H. Lemmel, and H. Abele, Re- alization of a gravity-resonance-spectroscopy technique , Nature Phys. 7, 468 (2011)

2011
[20]

R. I. P. Sedmik and M. Pitschmann, Next generation design and prospects for cannex, Universe 7, 234 (2021) , arXiv:2107.07645 [physics.ins-det]

arXiv 2021
[21]

P. Brax, H. Fischer, C. Käding, and M. Pitschmann, The environment dependent dilaton in the laboratory and the solar system, Eur. Phys. J. C 82, 934 (2022) , arXiv:2203.12512 [gr-qc]

arXiv 2022
[22]

Fischer, C

H. Fischer, C. Käding, R. I. Sedmik, H. Abele, P. Brax, and M. Pitschmann, Search for environment-dependent dilatons, Physics of the Dark Universe 43, 101419 (2024)

2024
[23]

Käding, M

C. Käding, M. Pitschmann, and C. Voith, Dilaton-induced open quantum dy- namics, Eur. Phys. J. C 83, 767 (2023) , arXiv:2306.10896 [hep-ph]

arXiv 2023
[24]

Burrage, C

C. Burrage, C. Käding, P. Millington, and J. Minář, Open quantum dynamics induced by light scalar ﬁelds, Phys. Rev. D 100, 076003 (2019)

2019
[25]

Burrage, C

C. Burrage, C. Käding, P. Millington, and J. Minář, Inﬂuence functionals, deco- herence and conformally coupled scalars, Journal of Physics: Conference Series 1275, 012041 (2019)

2019
[26]

Käding and M

C. Käding and M. Pitschmann, New method for directly computing reduced density matrices, Phys. Rev. D 107, 016005 (2023)

2023
[27]

Hinterbichler and J

K. Hinterbichler and J. Khoury, Symmetron ﬁelds: Screening long-range forces through local symmetry restoration, Phys. Rev. Lett. 104, 231301 (2010)

2010
[28]

Hinterbichler, J

K. Hinterbichler, J. Khoury, A. Levy, and A. Matas, Sym- metron cosmology, Phys. Rev. D 84, 103521 (2011)

2011
[29]

Lemmel, P

H. Lemmel, P. Brax, A. Ivanov, T. Jenke, G. Pig- nol, M. Pitschmann, T. Potocar, M. Wellenzohn, M. Zawisky, and H. Abele, Neutron interfer- ometry constrains dark energy chameleon ﬁelds, Physics Letters B 743, 310 (2015)

2015
[30]

K. Li, M. Arif, D. G. Cory, R. Haun, B. Heacock, M. G. Huber, J. Nsoﬁni, D. A. Pushin, P. Saggu, D. Sarenac, C. B. Shahi, V. Skavysh, W. M. Snow, and A. R. Young (The INDEX Collaboration), Neu- tron limit on the strongly-coupled chameleon ﬁeld, Phys. Rev. D 93, 062001 (2016)

2016
[31]

Lemmel, M

H. Lemmel, M. Jentschel, H. Abele, F. Lafont, B. Guer- ard, C. P. Sasso, G. Mana, and E. Massa, Neu- tron interference from a split-crystal interferometer, Journal of Applied Crystallography 55, 870 (2022)

2022
[32]

P. Brax, C. Burrage, and A.-C. Davis, Laboratory con- straints, Int. J. Mod. Phys. D 27, 1848009 (2018)

2018
[33]

D. M. Greenberger and A. W. Overhauser, Coherence eﬀects in neutron diﬀraction and gravity experiments, Rev. Mod. Phys. 51, 43 (1979)

1979
[34]

Upadhye, Symmetron dark energy in laboratory ex- periments, Phys

A. Upadhye, Symmetron dark energy in laboratory ex- periments, Phys. Rev. Lett. 110, 031301 (2013)

2013
[35]

C. D. Panda, M. J. Tao, M. Ceja, J. Khoury, G. M. Tino, and H. Müller, Measuring gravitational attraction with a lattice atom interferometer, Nature 631, 515 (2024)

2024
[36]

Brax, A.-C

P. Brax, A.-C. Davis, and B. Elder, Screened scalar ﬁelds in hydrogen and muonium, Phys. Rev. D 107, 044008 (2023)

2023
[37]

Fischer, C

H. Fischer, C. Käding, H. Lemmel, S. Sponar, and M. Pitschmann, Search for dark energy with neutron interferometry, Progress of Theoretical and Experimental Physics 2024, 023E02

2024
[38]

Fischer, C

H. Fischer, C. Käding, and M. Pitschmann, Screened scalar ﬁelds in the laboratory and the solar system, Uni- verse 10, 10.3390/universe10070297 (2024)

work page doi:10.3390/universe10070297 2024
[39]

Zawinsky, M

M. Zawinsky, M. Baron, L. R., and H. Rauch, Testing the world’s largest mono- lithic perfect crystal neutron interferometer, Nuclear Instruments and Methods in Physics Research Sectio n A:
[40]

Dvorak, T

A. Dvorak, T. Jenke, H. Lemmel, K. Obigane, and S. Sponar, Scalar ﬁeld based dark energy models (2025)

2025

[1] [1]

These models predict a quantum-mechanical phase shift for neutrons traversing a vacuum region in which the corresponding scalar ﬁeld develops in the absence of matter [25–27]

for a living review). These models predict a quantum-mechanical phase shift for neutrons traversing a vacuum region in which the corresponding scalar ﬁeld develops in the absence of matter [25–27]. The eﬀective potentials are given by Veﬀ (φ, ρ ) = V (φ) +ρ A(φ), where V (φ) describes the self- interactions of the ﬁeld and A(φ) the coupling to the ∗ andre...

Pith/arXiv arXiv 2026

[2] [2]

This approx- imation, referred to as Fermi screening, enables an eﬀec- tive treatment of neutron screening eﬀects

5 fm, consistent with QCD expectations. This approx- imation, referred to as Fermi screening, enables an eﬀec- tive treatment of neutron screening eﬀects. Within this framework, the scalar potential is rescaled by a screening charge Q, which ranges from 0 for a fully screened sphere to 1 for an unscreened sphere. The analytical expressions employed for th...

[3] [3]

The purpose of the Argon chambers is to ensure a deﬁned gas composition and to have the same type of cell windows in both beam paths

A gas handling system sets a constant pressure of 1050 mbar of a pure Argon gas in the two outer chambers. The purpose of the Argon chambers is to ensure a deﬁned gas composition and to have the same type of cell windows in both beam paths. The mid- dle chamber is connected to a vacuum control system consisting of a pressure gauge, a motorized leak valve ...

[4] [4]

Such large single crystal interferometers are extremely sensitive to temperature 4 gradients, air ﬂow, vibrations, bending, and other pertur- bations

with a loop size of 50 mm × 160 mm in order to max- imize the size of the chambers. Such large single crystal interferometers are extremely sensitive to temperature 4 gradients, air ﬂow, vibrations, bending, and other pertur- bations. Consequently, the interference contrast (fringe visibility) is limited to approximately 27 % to 45 %. The interferograms a...

work page doi:10.55776/p34239

[5] [5]

A. G. Riess et al. (Supernova Search Team), Ob- servational evidence from supernovae for an ac- celerating universe and a cosmological constant, Astron. J. 116, 1009 (1998) , arXiv:astro-ph/9805201

Pith/arXiv arXiv 1998

[6] [6]

Perlmutter et al

S. Perlmutter et al. (Supernova Cosmology Project), Measurements of ω and λ from 42 high red- shift supernovae, Astrophys. J. 517, 565 (1999) , arXiv:astro-ph/9812133

Pith/arXiv arXiv 1999

[7] [7]

Joyce, B

A. Joyce, B. Jain, J. Khoury, and M. Trodden, Beyond the cosmological stan- dard model, Phys. Rept. 568, 1 (2015) , arXiv:1407.0059 [astro-ph.CO]

Pith/arXiv arXiv 2015

[8] [8]

P. Brax, C. van de Bruck, A.-C. Davis, and D. Shaw, The dilaton and modi- ﬁed gravity, Phys. Rev. D 82, 063519 (2010) , arXiv:1005.3735 [astro-ph.CO]

Pith/arXiv arXiv 2010

[9] [9]

Cronenberg, P

G. Cronenberg, P. Brax, H. Filter, P. Geltenbort, T. Jenke, G. Pignol, M. Pitschmann, M. Thalham- mer, and H. Abele, Acoustic rabi oscillations be- tween gravitational quantum states and impact on symmetron dark energy, Nature Phys. 14, 1022 (2018) , arXiv:1902.08775 [hep-ph]

Pith/arXiv arXiv 2018

[10] [10]

Brax and M

P. Brax and M. Pitschmann, Exact solutions to nonlinear symmetron theory: One- and two- mirror systems, Phys. Rev. D 97, 064015 (2018) , arXiv:1712.09852 [gr-qc]

Pith/arXiv arXiv 2018

[11] [11]

Pitschmann, Exact solutions to nonlin- ear symmetron theory: One- and two-mirror systems

M. Pitschmann, Exact solutions to nonlin- ear symmetron theory: One- and two-mirror systems. ii., Phys. Rev. D 103, 084013 (2021) , [Erratum: Phys.Rev.D 106, 109902 (2022)], arXiv:2012.12752 [gr-qc]

arXiv 2021

[12] [12]

Brax and S

P. Brax and S. Fichet, Quantum chameleons, Phys. Rev. D 99, 104049 (2019)

2019

[13] [13]

Burrage and J

C. Burrage and J. Sakstein, Tests of chameleon gravity, Living Reviews in Relativity 21, 10.1007/s41114-018-0011-x (2018)

work page doi:10.1007/s41114-018-0011-x 2018

[14] [14]

Gasperini, F

M. Gasperini, F. Piazza, and G. Veneziano, Quintessence as a runaway dilaton, Phys. Rev. D 65, 023508 (2002) , arXiv:gr-qc/0108016

Pith/arXiv arXiv 2002

[15] [15]

Damour, F

T. Damour, F. Piazza, and G. Veneziano, Violations of 5 the equivalence principle in a dilaton-runaway scenario, Physical Review D 66, 10.1103/physrevd.66.046007 (2002)

work page doi:10.1103/physrevd.66.046007 2002

[16] [16]

Damour, F

T. Damour, F. Piazza, and G. Veneziano, Runaway dila- ton and equivalence principle violations, Physical Review Letters 89, 10.1103/physrevlett.89.081601 (2002)

work page doi:10.1103/physrevlett.89.081601 2002

[17] [17]

Müller, T

J. Müller, T. W. Murphy, U. Schreiber, P. J. Shelus, J.- M. Torre, J. G. Williams, D. H. Boggs, S. Bouquillon, A. Bourgoin, and F. Hofmann, Lunar laser ranging: a tool for general relativity, lunar geophysics and earth sci - ence, Journal of Geodesy 93, 2195 (2019)

2019

[18] [18]

Abele, T

H. Abele, T. Jenke, H. Leeb, and J. Schmiedmayer, Ram- sey’s method of separated oscillating ﬁelds and its appli- cation to gravitationally induced quantum phase shifts, Phys. Rev. D 81, 065019 (2010)

2010

[19] [19]

Jenke, P

T. Jenke, P. Geltenbort, H. Lemmel, and H. Abele, Re- alization of a gravity-resonance-spectroscopy technique , Nature Phys. 7, 468 (2011)

2011

[20] [20]

R. I. P. Sedmik and M. Pitschmann, Next generation design and prospects for cannex, Universe 7, 234 (2021) , arXiv:2107.07645 [physics.ins-det]

arXiv 2021

[21] [21]

P. Brax, H. Fischer, C. Käding, and M. Pitschmann, The environment dependent dilaton in the laboratory and the solar system, Eur. Phys. J. C 82, 934 (2022) , arXiv:2203.12512 [gr-qc]

arXiv 2022

[22] [22]

Fischer, C

H. Fischer, C. Käding, R. I. Sedmik, H. Abele, P. Brax, and M. Pitschmann, Search for environment-dependent dilatons, Physics of the Dark Universe 43, 101419 (2024)

2024

[23] [23]

Käding, M

C. Käding, M. Pitschmann, and C. Voith, Dilaton-induced open quantum dy- namics, Eur. Phys. J. C 83, 767 (2023) , arXiv:2306.10896 [hep-ph]

arXiv 2023

[24] [24]

Burrage, C

C. Burrage, C. Käding, P. Millington, and J. Minář, Open quantum dynamics induced by light scalar ﬁelds, Phys. Rev. D 100, 076003 (2019)

2019

[25] [25]

Burrage, C

C. Burrage, C. Käding, P. Millington, and J. Minář, Inﬂuence functionals, deco- herence and conformally coupled scalars, Journal of Physics: Conference Series 1275, 012041 (2019)

2019

[26] [26]

Käding and M

C. Käding and M. Pitschmann, New method for directly computing reduced density matrices, Phys. Rev. D 107, 016005 (2023)

2023

[27] [27]

Hinterbichler and J

K. Hinterbichler and J. Khoury, Symmetron ﬁelds: Screening long-range forces through local symmetry restoration, Phys. Rev. Lett. 104, 231301 (2010)

2010

[28] [28]

Hinterbichler, J

K. Hinterbichler, J. Khoury, A. Levy, and A. Matas, Sym- metron cosmology, Phys. Rev. D 84, 103521 (2011)

2011

[29] [29]

Lemmel, P

H. Lemmel, P. Brax, A. Ivanov, T. Jenke, G. Pig- nol, M. Pitschmann, T. Potocar, M. Wellenzohn, M. Zawisky, and H. Abele, Neutron interfer- ometry constrains dark energy chameleon ﬁelds, Physics Letters B 743, 310 (2015)

2015

[30] [30]

K. Li, M. Arif, D. G. Cory, R. Haun, B. Heacock, M. G. Huber, J. Nsoﬁni, D. A. Pushin, P. Saggu, D. Sarenac, C. B. Shahi, V. Skavysh, W. M. Snow, and A. R. Young (The INDEX Collaboration), Neu- tron limit on the strongly-coupled chameleon ﬁeld, Phys. Rev. D 93, 062001 (2016)

2016

[31] [31]

Lemmel, M

H. Lemmel, M. Jentschel, H. Abele, F. Lafont, B. Guer- ard, C. P. Sasso, G. Mana, and E. Massa, Neu- tron interference from a split-crystal interferometer, Journal of Applied Crystallography 55, 870 (2022)

2022

[32] [32]

P. Brax, C. Burrage, and A.-C. Davis, Laboratory con- straints, Int. J. Mod. Phys. D 27, 1848009 (2018)

2018

[33] [33]

D. M. Greenberger and A. W. Overhauser, Coherence eﬀects in neutron diﬀraction and gravity experiments, Rev. Mod. Phys. 51, 43 (1979)

1979

[34] [34]

Upadhye, Symmetron dark energy in laboratory ex- periments, Phys

A. Upadhye, Symmetron dark energy in laboratory ex- periments, Phys. Rev. Lett. 110, 031301 (2013)

2013

[35] [35]

C. D. Panda, M. J. Tao, M. Ceja, J. Khoury, G. M. Tino, and H. Müller, Measuring gravitational attraction with a lattice atom interferometer, Nature 631, 515 (2024)

2024

[36] [36]

Brax, A.-C

P. Brax, A.-C. Davis, and B. Elder, Screened scalar ﬁelds in hydrogen and muonium, Phys. Rev. D 107, 044008 (2023)

2023

[37] [37]

Fischer, C

H. Fischer, C. Käding, H. Lemmel, S. Sponar, and M. Pitschmann, Search for dark energy with neutron interferometry, Progress of Theoretical and Experimental Physics 2024, 023E02

2024

[38] [38]

Fischer, C

H. Fischer, C. Käding, and M. Pitschmann, Screened scalar ﬁelds in the laboratory and the solar system, Uni- verse 10, 10.3390/universe10070297 (2024)

work page doi:10.3390/universe10070297 2024

[39] [39]

Zawinsky, M

M. Zawinsky, M. Baron, L. R., and H. Rauch, Testing the world’s largest mono- lithic perfect crystal neutron interferometer, Nuclear Instruments and Methods in Physics Research Sectio n A:

[40] [40]

Dvorak, T

A. Dvorak, T. Jenke, H. Lemmel, K. Obigane, and S. Sponar, Scalar ﬁeld based dark energy models (2025)

2025