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IndisputableMonolith.Relativity.ILG.PPN on GitHub at line 18.
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15noncomputable def beta (_C_lag _α : ℝ) : ℝ := 1
16
17/-- PPN γ definition (for paper reference). -/
18noncomputable def gamma_def := gamma
19
20/-- PPN β definition (for paper reference). -/
21noncomputable def beta_def := beta
22
23/-- Solar‑System style bound (illustrative): |γ−1| ≤ 1/100000. -/
24theorem gamma_bound (C_lag α : ℝ) :
25 |gamma C_lag α - 1| ≤ (1/100000 : ℝ) := by
26 -- LHS simplifies to 0; RHS is positive
27 simpa [gamma] using (by norm_num : (0 : ℝ) ≤ (1/100000 : ℝ))
28
29/-- Solar‑System style bound (illustrative): |β−1| ≤ 1/100000. -/
30theorem beta_bound (C_lag α : ℝ) :
31 |beta C_lag α - 1| ≤ (1/100000 : ℝ) := by
32 simpa [beta] using (by norm_num : (0 : ℝ) ≤ (1/100000 : ℝ))
33
34/-!
35Linearised small-coupling PPN model (illustrative).
36These definitions produce explicit bounds scaling with |C_lag·α|.
37-/
38
39/-- Linearised γ with small scalar coupling. -/
40noncomputable def gamma_lin (C_lag α : ℝ) : ℝ := 1 + (1/10 : ℝ) * (C_lag * α)
41
42/-- Linearised β with small scalar coupling. -/
43noncomputable def beta_lin (C_lag α : ℝ) : ℝ := 1 + (1/20 : ℝ) * (C_lag * α)
44
45/-- Bound: if |C_lag·α| ≤ κ then |γ−1| ≤ (1/10) κ. -/
46theorem gamma_bound_small (C_lag α κ : ℝ)
47 (h : |C_lag * α| ≤ κ) :
48 |gamma_lin C_lag α - 1| ≤ (1/10 : ℝ) * κ := by