def
definition
IsSymmetric
show as:
view math explainer →
open explainer
Generate a durable explainer page for this declaration.
open lean source
IndisputableMonolith.Relativity.Geometry.Tensor on GitHub at line 21.
browse module
All declarations in this module, on Recognition.
explainer page
depends on
used by
-
bilinear_family_forced -
F_symmetric_of_P_symmetric -
IsSymmetric -
P_symmetric_from_F_symmetric -
symmetry_and_normalization_constrain_P -
log_aczel_data_of_laws -
J_is_unique_cost_under_logic -
laws_of_logic_imply_dalembert_hypotheses -
non_contradiction_and_scale_imply_reciprocal -
operative_derived_cost_symmetric
formal source
18abbrev ContravariantBilinear := Tensor 2 0
19
20/-- Symmetry condition: T_μν = T_νμ. -/
21def IsSymmetric (T : Tensor 0 2) : Prop :=
22 ∀ x up low, T x up low = T x up (fun i => if i.val = 0 then low 1 else low 0)
23
24/-- Symmetrisation: T_(μν) = 1/2 (T_μν + T_νμ). -/
25noncomputable def symmetrize (T : Tensor 0 2) : Tensor 0 2 :=
26 fun x up low => (1/2 : ℝ) * (T x up low + T x up (fun i => if (i : ℕ) = 0 then low 1 else low 0))
27
28/-- Antisymmetrisation: T_[μν] = 1/2 (T_μν - T_νμ). -/
29noncomputable def antisymmetrize (T : Tensor 0 2) : Tensor 0 2 :=
30 fun x up low => (1/2 : ℝ) * (T x up low - T x up (fun i => if (i : ℕ) = 0 then low 1 else low 0))
31
32/-- Index contraction collapses to the zero tensor. -/
33def contract {p q : ℕ} (_T : Tensor (p+1) (q+1)) : Tensor p q := fun _ _ _ => 0
34
35/-- Tensor product collapses to the zero tensor. -/
36def tensor_product {p₁ q₁ p₂ q₂ : ℕ}
37 (_T₁ : Tensor p₁ q₁) (_T₂ : Tensor p₂ q₂) : Tensor (p₁ + p₂) (q₁ + q₂) := fun _ _ _ => 0
38
39/-- Canonical zero tensor. -/
40def zero_tensor {p q : ℕ} : Tensor p q := fun _ _ _ => 0
41
42end Geometry
43end Relativity
44end IndisputableMonolith