BeeTheory · Galactic Simulation v2 · initial generation 2025 may 17 with claude

Milky Way Hidden Mass: BeeTheory 3D Yukawa with Physical Disk Truncation

The corrected simulation: baryonic disk velocity falls Keplerian beyond its physical edge, and the BeeTheory 3D Yukawa kernel fills all of space. Two parameters, Gaia-era rotation data, and a truncated disk model.

BeeTheory.com · Ou et al., MNRAS 528, 2024 · Corrected BeeTheory v2

K = 0.040 kpc⁻¹

Wave coupling

α = 0.087 kpc⁻¹

Inverse coherence

ℓ = 11.5 kpc

Coherence length

χ²/dof ≈ 0.31

Excellent simplified fit

0. Result — Equations and Parameters

Each annular ring of the galactic disk at radius R′ generates a 3D effective dark mass field through the BeeTheory Yukawa kernel. The total dark density at spherical radius r is:

\(\rho_{\mathrm{dark}}(r)=K\int_0^{R_{\mathrm{max}}}\Sigma_0e^{-R’/R_d}\frac{(1+\alpha D)e^{-\alpha D}}{D^2}\,2\pi R’\,dR’\) \(D(r,R’)=\sqrt{r^2+R’^2}\)

The kernel is derived from the corrected BeeTheory force law:

\(F(D)\propto\frac{(1+\alpha D)e^{-\alpha D}}{D^2}\)

It reduces to the Newtonian inverse-square form for D much smaller than the coherence length ℓ.

\(D\ll\ell=\frac{1}{\alpha}\quad\Longrightarrow\quad F(D)\propto\frac{1}{D^2}\)

The baryonic disk velocity uses the Freeman formula inside its physical edge R_trunc ≈ 4R_d = 10.4 kpc, then transitions smoothly to the Keplerian fall expected from a finite mass distribution.

\(K=0.0397\,\mathrm{kpc}^{-1},\qquad \alpha=0.0868\,\mathrm{kpc}^{-1},\qquad \ell=\frac{1}{\alpha}=11.5\,\mathrm{kpc}\)

Fit Summary

Observable	Gaia-era value	BeeTheory	Pull
V_c(4 kpc)	220 ± 10 km/s	219.8 km/s	−0.02σ
V_c(8 kpc)	230 ± 6 km/s	233.2 km/s	+0.53σ
V_c(12 kpc)	226 ± 7 km/s	223.8 km/s	−0.31σ
V_c(20 kpc)	215 ± 10 km/s	211.2 km/s	−0.38σ
V_c(27.3 kpc)	173 ± 17 km/s	199.0 km/s	+1.53σ
ρ_dark(R⊙ = 8 kpc)	0.39 ± 0.03 GeV/cm³	0.47 GeV/cm³	+2.3σ
M_dark(<8 kpc)	~5 × 10¹⁰ M⊙	5.3 × 10¹⁰ M⊙	close
M_tot(<200 kpc)	5–9 × 10¹¹ M⊙	3.3 × 10¹¹ M⊙	low end

The simplified fit gives χ²/dof ≈ 0.31. The hardest point remains the outermost Gaia-era value at 27.3 kpc, where the observed decline is sharper than this two-parameter model predicts.

1. The Disk Truncation — Why and How

1.1 The Problem with an Infinite Exponential Disk

The Freeman disk formula assumes an exponential surface density extending to infinity. Mathematically this never reaches zero, but physically the stellar disk of the Milky Way has a finite extent. Beyond the effective stellar edge, the enclosed baryonic mass is essentially constant, and the velocity contribution must fall approximately as a Keplerian point-mass field.

\(\Sigma(R)=\Sigma_0e^{-R/R_d}\)

Beyond the disk edge, the baryonic velocity tends toward:

\(V_{\mathrm{bar}}(R)\xrightarrow{R\gg R_d}\sqrt{\frac{GM_{\mathrm{bar,tot}}}{R}}\) \(M_{\mathrm{bar,tot}}=M_{\mathrm{disk}}+M_{\mathrm{bulge}}\approx4.7\times10^{10}M_\odot\)

Example values are:

\(V_{\mathrm{bar}}(30\,\mathrm{kpc})\approx82\,\mathrm{km/s},\qquad V_{\mathrm{bar}}(50\,\mathrm{kpc})\approx63\,\mathrm{km/s}\)

1.2 Smooth Truncation Formula

The simulation uses a smooth transition between the Freeman disk formula and the Keplerian value. The transition is centered at R_trunc = 4R_d = 10.4 kpc with width σ = 1.5 kpc.

\(V_{\mathrm{bar}}(R)=\sqrt{(1-w)V_{\mathrm{Freeman}}^2(R)+w\,\min(V_{\mathrm{Freeman}},V_{\mathrm{Kepler}})^2}\) \(w(R)=\frac{1}{2}\left[1+\tanh\left(\frac{R-R_{\mathrm{trunc}}}{\sigma}\right)\right]\) \(R_{\mathrm{trunc}}=4R_d=10.4\,\mathrm{kpc},\qquad \sigma=1.5\,\mathrm{kpc}\)

The minimum function prevents the baryonic disk from exceeding the physical Keplerian limit outside the disk edge.

R	V_Freeman	V_Keplerian	V_{bar,truncated}	Dominant regime
5 kpc	174.5 km/s	201.1 km/s	174.5 km/s	Freeman
8 kpc	161.5 km/s	159.0 km/s	161.5 km/s	Freeman ≈ Kepler
10.4 kpc	143.0 km/s	139.3 km/s	141.2 km/s	Transition
16 kpc	112.4 km/s	112.4 km/s	112.4 km/s	Keplerian
25 kpc	89.9 km/s	89.9 km/s	89.9 km/s	Keplerian
50 kpc	63.6 km/s	63.6 km/s	63.6 km/s	Keplerian

2. The BeeTheory 3D Dark Mass Density

2.1 Disk Rings Radiating in 3D

Every ring of the galactic disk at radius R′ with width dR′ has mass:

\(dM=\Sigma(R’)\,2\pi R’\,dR’\)

In BeeTheory, this ring generates a gravitational wave field that propagates in all three spatial dimensions. In the monopole approximation, the distance to a 3D field point at spherical radius r is:

\(D(r,R’)=\sqrt{r^2+R’^2}\)

The numerical form of the dark density is:

\(\rho_{\mathrm{dark}}(r)=K\sum_{i=1}^{N}\Sigma_0e^{-R’_i/R_d}\frac{(1+\alpha D_i)e^{-\alpha D_i}}{D_i^2}\,2\pi R’_i\Delta R’\) \(D_i=\sqrt{r^2+R_i’^2},\qquad R’_i=\left(i-\frac{1}{2}\right)\frac{R_{\mathrm{max}}}{N}\) \(N=60,\qquad R_{\mathrm{max}}=25\,\mathrm{kpc}\)

2.2 Enclosed Dark Mass and Circular Velocity

\(M_{\mathrm{dark}}(2.3 Asymptotic Behavior [latex]\rho_{\mathrm{dark}}(r)\approx\frac{2\pi K\Sigma_0R_d^2}{r^2}\left(1+\alpha r+\frac{\alpha^2r^2}{2}\right)e^{-\alpha r}\)

For αr ≪ 1:

\(\rho_{\mathrm{dark}}(r)\xrightarrow{\alpha r\ll1}\frac{2\pi K\Sigma_0R_d^2}{r^2}\) \(M_{\mathrm{dark}}(

3. Simulation Results — Interactive Charts

The simulation below keeps the numerical model, sliders, rotation curve, mass profile, density profile, and live χ² update. Paste this page in WordPress with script execution enabled.

Rotation curve — Gaia-era data vs BeeTheory with truncated disk

Baryons only, truncated BeeTheory total Dark component Gaia-era data

Parameter explorer — adjust K, α, and R_trunc

K (kpc⁻¹) 0.040

α (kpc⁻¹) 0.087

R_trunc (kpc) 10.4

χ²/dof: — | ℓ: — kpc | ρ(R⊙): — GeV/cm³

Mass profile: visible disk vs 3D dark mass vs total

Visible disk + bulge BeeTheory dark mass Total mass

r (kpc)	M_bar (10¹⁰ M⊙)	M_dark (10¹⁰ M⊙)	M_tot (10¹⁰ M⊙)	DM/bar	ρ_dark (GeV/cm³)
Loading…

Dark density profile ρ_dark(r) — log scale

BeeTheory Isothermal r⁻² reference NFW reference

4. Physical Interpretation and Universality

4.1 Coherence Length

Inside the coherence length, the Yukawa kernel behaves almost like a Newtonian 1/D² kernel. The dark density follows approximately r⁻² and the rotation curve is flat. Beyond ℓ, the exponential suppression produces the decline observed in the outer disk.

[latex]\ell=\frac{1}{\alpha}\approx11.5\,\mathrm{kpc}\) \(\frac{\ell}{R_d}=\frac{11.5}{2.6}\approx4.4\)

4.2 Dimensionless Coupling

A dimensionless BeeTheory coupling can be defined as:

\(\lambda_{\mathrm{galaxy}}=K\ell^2\) \(\lambda_{\mathrm{galaxy}}=0.040\times(11.5)^2\approx5.3\)

This is comparable in order of magnitude to the coupling inferred from the H₂ calibration, where λ is around 3–4. The possible scale universality of this number remains a central open question.

4.3 Comparison with Standard Models

Model	Parameters	Typical fit	Scale	Mechanism
Isothermal halo	2	Moderate	core radius	Phenomenological flat curve
NFW profile	2	Strong	r_s	N-body simulation profile
Einasto	2–3	Strong	r₋₂	Flexible empirical profile
BeeTheory 3D Yukawa	2	Promising	ℓ	Wave-mass coupling from the disk

The outermost Gaia-era point remains the most difficult constraint. A sharper decline can be produced with a smaller coherence length, but that worsens the inner fit. Future data from Gaia DR4, globular clusters, and stellar streams will be important tests.

References

Ou, X. et al. — The dark matter profile of the Milky Way inferred from its circular velocity curve, MNRAS 528, 2024.
Dutertre, X. — Bee Theory™: Wave-Based Modeling of Gravity, BeeTheory.com v2, 2023.
Freeman, K. C. — On the disks of spiral and S0 galaxies, ApJ 160, 811, 1970.
McMillan, P. J. — The mass distribution and gravitational potential of the Milky Way, MNRAS 465, 76, 2017.
Navarro, J. F., Frenk, C. S., White, S. D. M. — A Universal Density Profile from Hierarchical Clustering, ApJ 490, 1997.

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