theorem
proved
K_net_value
show as:
view math explainer →
open explainer
Generate a durable explainer page for this declaration.
open lean source
IndisputableMonolith.Gravity.CoerciveProjection on GitHub at line 50.
browse module
All declarations in this module, on Recognition.
explainer page
depends on
formal source
47 (9/7)^2. The 9 arises from the full cycle including the return tick. -/
48def K_net : ℚ := (9 / 7) ^ 2
49
50theorem K_net_value : K_net = 81 / 49 := by
51 unfold K_net; norm_num
52
53theorem K_net_gt_one : (1 : ℚ) < K_net := by
54 unfold K_net; norm_num
55
56/-- The projection bound C_proj <= 2 from the CPM paper.
57 This bounds the operator norm of the ILG projection kernel. -/
58def C_proj : ℚ := 2
59
60theorem C_proj_value : C_proj = 2 := rfl
61
62/-- The defect bound: Defect(Phi) <= M * K_net * C_proj * sup T_W[Phi].
63 The constant M * K_net * C_proj controls the stability of the energy minimizer. -/
64def defect_bound_constant : ℚ := K_net * C_proj
65
66theorem defect_bound_constant_value :
67 defect_bound_constant = 162 / 49 := by
68 unfold defect_bound_constant K_net C_proj; norm_num
69
70/-! ## Pressure Equivalence -/
71
72/-- The ILG modified Poisson equation is EQUIVALENT to the standard Poisson
73 equation with an effective pressure source:
74
75 ILG: nabla^2 Phi = 4*pi*G * a^2 * (w * rho_b * delta_b)
76 Standard: nabla^2 Phi = 4*pi*G * a^2 * p
77
78 where p = w * rho_b * delta_b is the "effective pressure."
79
80 This equivalence means ILG is NOT a modification of GR's field equations