definition llor: ynat → relation4 term lenv lenv lenv ≝ λd,T,L2,L1,L.
∧∧ |L1| = |L2| & |L1| = |L|
& (∀I1,I2,I,K1,K2,K,V1,V2,V,i.
- â\87©[i] L1 â\89¡ K1.â\93\91{I1}V1 â\86\92 â\87©[i] L2 â\89¡ K2.â\93\91{I2}V2 â\86\92 â\87©[i] L ≡ K.ⓑ{I}V → ∨∨
+ â¬\87[i] L1 â\89¡ K1.â\93\91{I1}V1 â\86\92 â¬\87[i] L2 â\89¡ K2.â\93\91{I2}V2 â\86\92 â¬\87[i] L ≡ K.ⓑ{I}V → ∨∨
(∧∧ yinj i < d & I1 = I & V1 = V) |
(∧∧ (L1 ⊢ i ϵ 𝐅*[d]⦃T⦄ → ⊥) & I1 = I & V1 = V) |
(∧∧ d ≤ yinj i & L1 ⊢ i ϵ 𝐅*[d]⦃T⦄ & I2 = I & V2 = V)
lemma llor_atom: ∀T,d. ⋆ ⩖[T, d] ⋆ ≡ ⋆.
#T #d @and3_intro //
#I1 #I2 #I #K1 #K2 #K #V1 #V2 #V #i #HLK1
-elim (ldrop_inv_atom1 … HLK1) -HLK1 #H destruct
+elim (drop_inv_atom1 … HLK1) -HLK1 #H destruct
qed.