(\lambda f. (f 0 (le_n 0))
- \lambda n. \lambda H. (refl_equal nat 0)))
+ \lambda n. \lambda H. (refl_equal nat 0))
+###### INTERPRETATION NUMBER 1 ######
+### (* disambiguation environment *)
+alias id le_n = cic:/Coq/Init/Peano/le.ind#1/1/1
+alias id nat = cic:/Coq/Init/Datatypes/nat.ind#1/1
+alias id refl_equal = cic:/Coq/Init/Logic/eq.ind#1/1/1
+alias num (instance 0) = "natural number"
### (* METASENV after disambiguation *)
-f : (nat->((le O O)->(eq nat O O))); _ : nat |- ?14: Type
-f : (nat->((le O O)->(eq nat O O))); _ : nat |- ?15: ?14[-2 ; -1]
+
### (* TERM after disambiguation *)
([f:(nat->((le O O)->(eq nat O O)))](f O (le_n O)) [n:nat][H:(le O O)](refl_equal nat O))
### (* TYPE_OF the disambiguated term *)