(* Constructions with rtc_plus **********************************************)
-lemma rtc_ist_plus (n1) (n2) (c1) (c2): ð\9d\90\93â\9dªn1,c1â\9d« â\86\92 ð\9d\90\93â\9dªn2,c2â\9d« â\86\92 ð\9d\90\93â\9dªn1+n2,c1+c2â\9d«.
+lemma rtc_ist_plus (n1) (n2) (c1) (c2): ð\9d\90\93â\9d¨n1,c1â\9d© â\86\92 ð\9d\90\93â\9d¨n2,c2â\9d© â\86\92 ð\9d\90\93â\9d¨n1+n2,c1+c2â\9d©.
#n1 #n2 #c1 #c2 #H1 #H2 destruct //
qed.
-lemma rtc_ist_plus_zero_sn (n) (c1) (c2): ð\9d\90\93â\9dªð\9d\9f\8e,c1â\9d« â\86\92 ð\9d\90\93â\9dªn,c2â\9d« â\86\92 ð\9d\90\93â\9dªn,c1+c2â\9d«.
+lemma rtc_ist_plus_zero_sn (n) (c1) (c2): ð\9d\90\93â\9d¨ð\9d\9f\8e,c1â\9d© â\86\92 ð\9d\90\93â\9d¨n,c2â\9d© â\86\92 ð\9d\90\93â\9d¨n,c1+c2â\9d©.
#n #c1 #c2 #H1 #H2 >(nplus_zero_sn n)
/2 width=1 by rtc_ist_plus/
qed.
-lemma rtc_ist_plus_zero_dx (n) (c1) (c2): ð\9d\90\93â\9dªn,c1â\9d« â\86\92 ð\9d\90\93â\9dªð\9d\9f\8e,c2â\9d« â\86\92 ð\9d\90\93â\9dªn,c1+c2â\9d«.
+lemma rtc_ist_plus_zero_dx (n) (c1) (c2): ð\9d\90\93â\9d¨n,c1â\9d© â\86\92 ð\9d\90\93â\9d¨ð\9d\9f\8e,c2â\9d© â\86\92 ð\9d\90\93â\9d¨n,c1+c2â\9d©.
/2 width=1 by rtc_ist_plus/ qed.
-lemma rtc_ist_succ (n) (c): ð\9d\90\93â\9dªn,câ\9d« â\86\92 ð\9d\90\93â\9dªâ\86\91n,c+ð\9d\9f\98ð\9d\9f\99â\9d«.
-#n #c #H >nplus_one_dx
+lemma rtc_ist_succ (n) (c): ð\9d\90\93â\9d¨n,câ\9d© â\86\92 ð\9d\90\93â\9d¨â\86\91n,c+ð\9d\9f\98ð\9d\9f\99â\9d©.
+#n #c #H >nplus_unit_dx
/2 width=1 by rtc_ist_plus/
qed.
(* Inversions with rtc_plus *************************************************)
-lemma rtc_ist_inv_plus (n) (c1) (c2): ð\9d\90\93â\9dªn,c1 + c2â\9d« →
- â\88\83â\88\83n1,n2. ð\9d\90\93â\9dªn1,c1â\9d« & ð\9d\90\93â\9dªn2,c2â\9d« & n1 + n2 = n.
+lemma rtc_ist_inv_plus (n) (c1) (c2): ð\9d\90\93â\9d¨n,c1 + c2â\9d© →
+ â\88\83â\88\83n1,n2. ð\9d\90\93â\9d¨n1,c1â\9d© & ð\9d\90\93â\9d¨n2,c2â\9d© & n1 + n2 = n.
#n #c1 #c2 #H
elim (rtc_plus_inv_dx … H) -H #ri1 #rs1 #ti1 #ts1 #ri2 #rs2 #ti2 #ts2 #H1 #H2 #H3 #H4 #H5 #H6 destruct
elim (eq_inv_nplus_zero … H1) -H1 #H11 #H12 destruct
/3 width=5 by ex3_2_intro/
qed-.
-lemma rtc_ist_inv_plus_zero_dx (n) (c1) (c2): ð\9d\90\93â\9dªn,c1 + c2â\9d« â\86\92 ð\9d\90\93â\9dªð\9d\9f\8e,c2â\9d« â\86\92 ð\9d\90\93â\9dªn,c1â\9d«.
+lemma rtc_ist_inv_plus_zero_dx (n) (c1) (c2): ð\9d\90\93â\9d¨n,c1 + c2â\9d© â\86\92 ð\9d\90\93â\9d¨ð\9d\9f\8e,c2â\9d© â\86\92 ð\9d\90\93â\9d¨n,c1â\9d©.
#n #c1 #c2 #H #H2
elim (rtc_ist_inv_plus … H) -H #n1 #n2 #Hn1 #Hn2 #H destruct //
qed-.
-lemma rtc_ist_inv_plus_one_dx:
- â\88\80n,c1,c2. ð\9d\90\93â\9dªn,c1 + c2â\9d« â\86\92 ð\9d\90\93â\9dªð\9d\9f\8f,c2â\9d« →
- â\88\83â\88\83m. ð\9d\90\93â\9dªm,c1â\9d« & n = ↑m.
+lemma rtc_ist_inv_plus_unit_dx:
+ â\88\80n,c1,c2. ð\9d\90\93â\9d¨n,c1 + c2â\9d© â\86\92 ð\9d\90\93â\9d¨ð\9d\9f\8f,c2â\9d© →
+ â\88\83â\88\83m. ð\9d\90\93â\9d¨m,c1â\9d© & n = ↑m.
#n #c1 #c2 #H #H2 destruct
elim (rtc_ist_inv_plus … H) -H #n1 #n2 #Hn1 #Hn2 #H destruct
/2 width=3 by ex2_intro/
qed-.
-lemma rtc_ist_inv_plus_zu_dx (n) (c): ð\9d\90\93â\9dªn,c+ð\9d\9f\99ð\9d\9f\98â\9d« → ⊥.
+lemma rtc_ist_inv_plus_zu_dx (n) (c): ð\9d\90\93â\9d¨n,c+ð\9d\9f\99ð\9d\9f\98â\9d© → ⊥.
#n #c #H
elim (rtc_ist_inv_plus … H) -H #n1 #n2 #_ #H #_
/2 width=2 by rtc_ist_inv_uz/