(* Main inversions with pr_eq ***********************************************)
(*** isdiv_inv_eq_repl *)
-corec theorem pr_isd_inv_eq_repl (g1) (g2): ð\9d\9b\80â\9dªg1â\9d« â\86\92 ð\9d\9b\80â\9dªg2â\9d« → g1 ≡ g2.
+corec theorem pr_isd_inv_eq_repl (g1) (g2): ð\9d\9b\80â\9d¨g1â\9d© â\86\92 ð\9d\9b\80â\9d¨g2â\9d© → g1 ≡ g2.
#H1 #H2
cases (pr_isd_inv_gen … H1) -H1
cases (pr_isd_inv_gen … H2) -H2
(* Alternative definition with pr_eq ****************************************)
(*** eq_next_isdiv *)
-corec lemma pr_eq_next_isd (f): â\86\91f â\89¡ f â\86\92 ð\9d\9b\80â\9dªfâ\9d«.
+corec lemma pr_eq_next_isd (f): â\86\91f â\89¡ f â\86\92 ð\9d\9b\80â\9d¨fâ\9d©.
#H cases (pr_eq_inv_next_sn … H) -H
/4 width=3 by pr_isd_next, pr_eq_trans/
qed.
(*** eq_next_inv_isdiv *)
-corec lemma pr_eq_next_inv_isd (g): ð\9d\9b\80â\9dªgâ\9d« → ↑g ≡ g.
+corec lemma pr_eq_next_inv_isd (g): ð\9d\9b\80â\9d¨gâ\9d© → ↑g ≡ g.
* -g #f #g #Hf *
/3 width=5 by pr_eq_next/
qed-.