(* Note: one of these U is the inferred type of T *)
lemma aaa_cpm_SO (h) (G) (L) (A):
- â\88\80T. â¦\83G,Lâ¦\84 â\8a¢ T â\81\9d A â\86\92 â\88\83U. â¦\83G,Lâ¦\84 ⊢ T ➡[1,h] U.
+ â\88\80T. â\9dªG,Lâ\9d« â\8a¢ T â\81\9d A â\86\92 â\88\83U. â\9dªG,Lâ\9d« ⊢ T ➡[1,h] U.
#h #G #L #A #T #H elim H -G -L -T -A
[ /3 width=2 by ex_intro/
| * #G #L #V #B #_ * #V0 #HV0
- [ elim (lifts_total V0 (ð\9d\90\94â\9d´1â\9dµ)) #W0 #HVW0
+ [ elim (lifts_total V0 (ð\9d\90\94â\9d¨1â\9d©)) #W0 #HVW0
/3 width=4 by cpm_delta, ex_intro/
- | elim (lifts_total V (ð\9d\90\94â\9d´1â\9dµ)) #W #HVW -V0
+ | elim (lifts_total V (ð\9d\90\94â\9d¨1â\9d©)) #W #HVW -V0
/3 width=4 by cpm_ell, ex_intro/
]
| #I #G #L #A #i #_ * #T0 #HT0
- elim (lifts_total T0 (ð\9d\90\94â\9d´1â\9dµ)) #U0 #HTU0
+ elim (lifts_total T0 (ð\9d\90\94â\9d¨1â\9d©)) #U0 #HTU0
/3 width=4 by cpm_lref, ex_intro/
| #p #G #L #V #T #B #A #_ #_ #_ * #T0 #HT0
/3 width=2 by cpm_bind, ex_intro/