(* Main inversion lemmas ****************************************************)
-theorem aaa_mono: â\88\80G,L,T,A1. â¦\83G,Lâ¦\84 â\8a¢ T â\81\9d A1 â\86\92 â\88\80A2. â¦\83G,Lâ¦\84 ⊢ T ⁝ A2 → A1 = A2.
+theorem aaa_mono: â\88\80G,L,T,A1. â\9d¨G,Lâ\9d© â\8a¢ T â\81\9d A1 â\86\92 â\88\80A2. â\9d¨G,Lâ\9d© ⊢ T ⁝ A2 → A1 = A2.
#G #L #T #A1 #H elim H -G -L -T -A1
[ #G #L #s #A2 #H >(aaa_inv_sort … H) -H //
| #I1 #G #L #V1 #B #_ #IH #A2 #H
(* Advanced inversion lemmas ************************************************)
lemma aaa_aaa_inv_appl (G) (L) (V) (T) (B) (X):
- â\88\80A. â¦\83G,Lâ¦\84 â\8a¢ â\93\90V.T â\81\9d A â\86\92 â¦\83G,Lâ¦\84 â\8a¢ V â\81\9d B â\86\92 â¦\83G,Lâ¦\84⊢ T ⁝ X → ②B.A = X.
+ â\88\80A. â\9d¨G,Lâ\9d© â\8a¢ â\93\90V.T â\81\9d A â\86\92 â\9d¨G,Lâ\9d© â\8a¢ V â\81\9d B â\86\92 â\9d¨G,Lâ\9d©⊢ T ⁝ X → ②B.A = X.
#G #L #V #T #B #X #A #H #H1V #H1T
elim (aaa_inv_appl … H) -H #B0 #H2V #H2T
lapply (aaa_mono … H2V … H1V) -V #H destruct
qed-.
lemma aaa_aaa_inv_cast (G) (L) (U) (T) (B) (A):
- â\88\80X. â¦\83G,Lâ¦\84 â\8a¢ â\93\9dU.T â\81\9d X â\86\92 â¦\83G,Lâ¦\84 â\8a¢ U â\81\9d B â\86\92 â¦\83G,Lâ¦\84⊢ T ⁝ A → ∧∧ B = X & A = X.
+ â\88\80X. â\9d¨G,Lâ\9d© â\8a¢ â\93\9dU.T â\81\9d X â\86\92 â\9d¨G,Lâ\9d© â\8a¢ U â\81\9d B â\86\92 â\9d¨G,Lâ\9d©⊢ T ⁝ A → ∧∧ B = X & A = X.
#G #L #U #T #B #A #X #H #H1U #H1T
elim (aaa_inv_cast … H) -H #H2U #H2T
lapply (aaa_mono … H1U … H2U) -U #HB