Single-Constant Transfer From Solar Limb To A Rapid Rotator
Objective
Demonstrate universality of the Law of Universal Coherence by transferring the solar‑calibrated alignment–extinction constant k_Ӕ to predict the limb darkening of Altair (α Aquilae) without any retuning. Pass condition: a fixed k_Ӕ, derived once from the solar limb, reproduces Altair’s normalized limb profile within observational tolerances.
Assumptions & Defaults (v1)
• k_Ӕ = 2.91 × 10⁻⁴ (Mpc·arb)⁻¹, fixed from the solar limb fit
• Baseline limb geometry uses S(μ) = A(μ⁻ᵖ − 1), with A = 0.85, p = 0.6
• v1 treats Altair as a spherical emitter for the baseline comparison; a rotation correction (gravity darkening/oblateness) is added as an option in the procedure but not used to set k_Ӕ
Method
(Baseline Transfer)
1. Normalize Altair’s observed intensity profile I_obs(μ) to I0 = I_obs(μ=1).
2. Predict the normalized intensity via the Ӕ law using the fixed constant:
I_model(μ)/I0 = exp(− k_Ӕ · S(μ)).
3. Compare I_model(μ)/I0 to the observed profile. No parameter is retuned.
4. PASS if residuals are within published uncertainties or within the spread of standard limb‑darkening laws at comparable bands.
Optional Rotation/Oblateness Correction (v1+)
For a rapidly rotating star like Altair, include a simple gravity‑darkening weight w(θ) ∝ g_eff(θ)^β, with a Roche‑like effective gravity and β ≈ 0.19–0.25 for radiative envelopes. This alters the mapping between disk position and μ via latitude‑dependent brightness. In the Ӕ framework, this is treated as an angular reweighting of S(μ) across the projected disk, keeping k_Ӕ fixed.
Baseline Prediction Table
(Snippet)
The table below shows a subset of the baseline prediction using the fixed k_Ӕ and the default S(μ). A full 50‑point CSV is provided in the data package.
| μ | S(μ) | I_model(μ)/I0 |
| 0.020 | 8.037936 | 0.997664 |
| 0.040 | 5.013851 | 0.998542 |
| 0.060 | 3.747568 | 0.998910 |
| 0.080 | 3.018699 | 0.999122 |
| 0.100 | 2.533911 | 0.999263 |
| 0.120 | 2.183264 | 0.999365 |
| 0.140 | 1.915299 | 0.999443 |
| 0.160 | 1.702389 | 0.999505 |
| 0.180 | 1.528239 | 0.999555 |
| 0.200 | 1.382549 | 0.999598 |
Diagnostics & Pass Criteria
• Residuals: Compute Δ(μ) = I_obs(μ)/I0 − I_model(μ)/I0 across the observed μ grid.
• PASSif RMS[Δ(μ)] ≤ σ_stat ⊕ σ_sys of the published limb profile (band‑specific), without altering k_Ӕ.
• If Altair’s rapid rotation is significant in the band used, apply the rotation reweighting once (v1+): if this collapses residuals within tolerance while keeping k_Ӕ fixed, the transfer still PASSes.
• FAIL if no reasonable rotation reweighting removes a systematic bias while holding k_Ӕ constant.
Notes
• Universality Claim: k_Ӕ is global. Environment enters only via S(μ), a purely geometric/structural factor.
• Band Dependence:Compare within the same photometric band as the solar limb calibration or treat bandpass differences as part of S(μ) reweighting.
• No Curve Fitting: k_Ӕ derived from the Sun is not adjusted for Altair. This is the core of the universality test.
Summary
This report freezes the universal constant k_Ӕ from the solar limb and projects it to Altair’s limb without retuning. If the observed limb profile of Altair is reproduced within uncertainties, the Law of Universal Coherence passes a stringent, cross‑object test: the same geometric alignment law governs limb darkening for both the Sun and a rapid rotator.
Produced by The Lilborn Equation Team:
Michael Lilborn-Williams
Daniel Thomas Rouse
Thomas Jackson Barnard
Audrey Williams