/4 width=5 by feqx_intro_sn, reqx_trans, teqx_reqx_div, teqx_trans/
qed-.
-theorem feqx_canc_sn: â\88\80G,G1,L,L1,T,T1. â¦\83G,L,Tâ¦\84 â\89\9b â¦\83G1,L1,T1â¦\84→
- â\88\80G2,L2,T2. â¦\83G,L,Tâ¦\84 â\89\9b â¦\83G2,L2,T2â¦\84 â\86\92 â¦\83G1,L1,T1â¦\84 â\89\9b â¦\83G2,L2,T2â¦\84.
+theorem feqx_canc_sn: â\88\80G,G1,L,L1,T,T1. â\9dªG,L,Tâ\9d« â\89\9b â\9dªG1,L1,T1â\9d«→
+ â\88\80G2,L2,T2. â\9dªG,L,Tâ\9d« â\89\9b â\9dªG2,L2,T2â\9d« â\86\92 â\9dªG1,L1,T1â\9d« â\89\9b â\9dªG2,L2,T2â\9d«.
/3 width=5 by feqx_trans, feqx_sym/ qed-.
-theorem feqx_canc_dx: â\88\80G1,G,L1,L,T1,T. â¦\83G1,L1,T1â¦\84 â\89\9b â¦\83G,L,Tâ¦\84 →
- â\88\80G2,L2,T2. â¦\83G2,L2,T2â¦\84 â\89\9b â¦\83G,L,Tâ¦\84 â\86\92 â¦\83G1,L1,T1â¦\84 â\89\9b â¦\83G2,L2,T2â¦\84.
+theorem feqx_canc_dx: â\88\80G1,G,L1,L,T1,T. â\9dªG1,L1,T1â\9d« â\89\9b â\9dªG,L,Tâ\9d« →
+ â\88\80G2,L2,T2. â\9dªG2,L2,T2â\9d« â\89\9b â\9dªG,L,Tâ\9d« â\86\92 â\9dªG1,L1,T1â\9d« â\89\9b â\9dªG2,L2,T2â\9d«.
/3 width=5 by feqx_trans, feqx_sym/ qed-.
(* Main inversion lemmas with degree-based equivalence on terms *************)
-theorem feqx_tneqx_repl_dx: â\88\80G1,G2,L1,L2,T1,T2. â¦\83G1,L1,T1â¦\84 â\89\9b â¦\83G2,L2,T2â¦\84 →
- â\88\80U1,U2. â¦\83G1,L1,U1â¦\84 â\89\9b â¦\83G2,L2,U2â¦\84 →
+theorem feqx_tneqx_repl_dx: â\88\80G1,G2,L1,L2,T1,T2. â\9dªG1,L1,T1â\9d« â\89\9b â\9dªG2,L2,T2â\9d« →
+ â\88\80U1,U2. â\9dªG1,L1,U1â\9d« â\89\9b â\9dªG2,L2,U2â\9d« →
(T2 ≛ U2 → ⊥) → (T1 ≛ U1 → ⊥).
#G1 #G2 #L1 #L2 #T1 #T2 #HT #U1 #U2 #HU #HnTU2 #HTU1
elim (feqx_inv_gen_sn … HT) -HT #_ #_ #HT
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