| le_n : le n n
| le_S : \forall m:nat. le n m \to le n (S m).
-(*CSC: the URI must disappear: there is a bug now *)
-interpretation "natural 'less or equal to'" 'leq x y = (cic:/matita/library_autobatch/nat/orders/le.ind#xpointer(1/1) x y).
-(*CSC: the URI must disappear: there is a bug now *)
-interpretation "natural 'neither less nor equal to'" 'nleq x y =
- (cic:/matita/logic/connectives/Not.con
- (cic:/matita/library_autobatch/nat/orders/le.ind#xpointer(1/1) x y)).
+interpretation "natural 'less or equal to'" 'leq x y = (le x y).
+interpretation "natural 'neither less nor equal to'" 'nleq x y = (Not (le x y)).
definition lt: nat \to nat \to Prop \def
\lambda n,m:nat.(S n) \leq m.
-(*CSC: the URI must disappear: there is a bug now *)
-interpretation "natural 'less than'" 'lt x y = (cic:/matita/library_autobatch/nat/orders/lt.con x y).
-(*CSC: the URI must disappear: there is a bug now *)
-interpretation "natural 'not less than'" 'nless x y =
- (cic:/matita/logic/connectives/Not.con (cic:/matita/library_autobatch/nat/orders/lt.con x y)).
+interpretation "natural 'less than'" 'lt x y = (lt x y).
+interpretation "natural 'not less than'" 'nless x y = (Not (lt x y)).
definition ge: nat \to nat \to Prop \def
\lambda n,m:nat.m \leq n.
-(*CSC: the URI must disappear: there is a bug now *)
-interpretation "natural 'greater or equal to'" 'geq x y = (cic:/matita/library_autobatch/nat/orders/ge.con x y).
+interpretation "natural 'greater or equal to'" 'geq x y = (ge x y).
definition gt: nat \to nat \to Prop \def
\lambda n,m:nat.m<n.
-(*CSC: the URI must disappear: there is a bug now *)
-interpretation "natural 'greater than'" 'gt x y = (cic:/matita/library_autobatch/nat/orders/gt.con x y).
-(*CSC: the URI must disappear: there is a bug now *)
-interpretation "natural 'not greater than'" 'ngtr x y =
- (cic:/matita/logic/connectives/Not.con (cic:/matita/library_autobatch/nat/orders/gt.con x y)).
+interpretation "natural 'greater than'" 'gt x y = (gt x y).
+interpretation "natural 'not greater than'" 'ngtr x y = (Not (gt x y)).
theorem transitive_le : transitive nat le.
unfold transitive.