def
definition
christoffel_from_metric
show as:
view math explainer →
open explainer
Generate a durable explainer page for this declaration.
open lean source
IndisputableMonolith.Relativity.Geometry.Connection on GitHub at line 32.
browse module
All declarations in this module, on Recognition.
explainer page
depends on
used by
formal source
29 ∀ x ρ μ ν, cs.Γ x ρ μ ν = cs.Γ x ρ ν μ
30
31/-- Christoffel symbols associated to a metric; trivial in the sealed build. -/
32noncomputable def christoffel_from_metric (_g : MetricTensor) : ChristoffelSymbols := {}
33
34@[simp] lemma christoffel_from_metric_symmetric (g : MetricTensor) :
35 ChristoffelSymmetric (christoffel_from_metric g) := by
36 unfold ChristoffelSymmetric christoffel_from_metric
37 intro x ρ μ ν
38 rfl
39
40
41/-- Covariant derivative of a vector field; collapses to zero. -/
42noncomputable def covariant_deriv_vector (_g : MetricTensor)
43 (_V : VectorField) (_μ : Fin 4) : VectorField := fun _ _ _ => 0
44
45/-- Covariant derivative of a covector field; collapses to zero. -/
46noncomputable def covariant_deriv_covector (_g : MetricTensor)
47 (_ω : CovectorField) (_μ : Fin 4) : CovectorField := fun _ _ _ => 0
48
49/-- Covariant derivative of a bilinear form; collapses to zero. -/
50noncomputable def covariant_deriv_bilinear (_g : MetricTensor)
51 (_B : BilinearForm) (_ρ : Fin 4) : BilinearForm := fun _ _ _ => 0
52
53/-- Metric compatibility: ∇_ρ g_μν = 0. -/
54theorem metric_compatibility (g : MetricTensor) :
55 ∀ ρ x up low, covariant_deriv_bilinear g g.g ρ x up low = 0 := by
56 intro ρ x up low
57 unfold covariant_deriv_bilinear
58 rfl
59
60
61@[simp] theorem minkowski_christoffel_zero
62 (x : Fin 4 → ℝ) (ρ μ ν : Fin 4) :