The Plateau Height Scales with V_ring

Letting the asymptote depend on the galaxy’s own rotation velocity

BeeTheory.com · Real data · 21 May 2026

Result first

The single flat asymptote of the reference curve (1.60 for every galaxy) was a compromise. In fact the plateau height — how far V/V_ring rises above the visible ring — correlates with V_ring: smaller, slower galaxies rise higher, larger ones stay near 1. Making the asymptote a function of V_ring captures this, with the right physical meaning: dwarfs carry proportionally more missing velocity than massive spirals.

1. The correlation

Measuring each galaxy’s plateau (median V/V_ring in the outer third) against its V_ring shows a clear trend: the strongest single correlation among all geometric parameters tested (r = −0.60, stronger than mass, radius, or extent). The sign is negative — high V_ring means a low normalized plateau.

Plateau height vs V_ring — Measured plateau height V/V_ring (green) against V_ring on a log axis, with the fitted relation (red). Slow galaxies (left) plateau high; fast galaxies (right) plateau near or below 1.

The fitted asymptote is:

asymptote = 1 + [ −0.332·ln(V_ring) + 1.826 ]

V_ring (km/s)	asymptote	type
20	1.83	dwarf
50	1.53	—
100	1.30	—
200	1.07	spiral
300	0.93	massive (declining)

2. The curve with a variable asymptote

Inserting this into the saturating form gives a family of curves, all anchored at (1, 1) but flattening at different heights according to V_ring:

V/V_ring = 1 + A(V_ring)·(x−1)/(x+0.76), A(V_ring) = −0.332·ln(V_ring) + 1.826, x = R/R_ring

Reference curves with V_ring-dependent asymptote — The 143 disk+gas curves (faint) with three reference curves for V_ring = 30, 80, 200 km/s. All cross (1, 1); the dwarf curve (blue) rises to 1.70, the spiral curve (red) stays near 1.07. The family spans the observed spread far better than one fixed asymptote.

The fit improves modestly — median deviation 0.287 versus 0.299 for the fixed asymptote — but the gain is mainly conceptual: the plateau is no longer an arbitrary constant. It is set by the galaxy’s own rotation velocity, and the trend reproduces a known fact, that smaller galaxies are more dark-matter-dominated.

What it means

A massive spiral (high V_ring) plateaus near 1 — its visible ring nearly accounts for its rotation. A dwarf (low V_ring) plateaus near 1.8 — most of its rotation needs something beyond the visible ring. The single law now encodes this gradient with one extra coefficient, turning the fixed asymptote into a physical scaling.

Honesty note

All velocities are real SPARC data (Lelli, McGaugh & Schombert 2016); V_ring and R_ring from the fixed per-galaxy table. The correlation (r = −0.60, R² ≈ 0.36) is real but partly mechanical: V_ring sits in the denominator of V/V_ring, so some anticorrelation is built in. The improvement in fit is small; the value here is the physical reading, not a large numerical gain. A cleaner test — correlating the absolute excess (V_plateau − V_ring, in km/s) with V_ring — would separate the physical effect from the mechanical one.

BeeTheory.com — The plateau height scales with V_ring · Data: Lelli, McGaugh & Schombert 2016 · Initial generation: 21 May 2026 with Claude.ai · © Technoplane S.A.S. 2026