(**************************************************************************)
-(* ___ *)
+(* ___ *)
(* ||M|| *)
(* ||A|| A project by Andrea Asperti *)
(* ||T|| *)
[O \Rightarrow m
| (S p) \Rightarrow mod_aux n n p].
+interpretation "natural remainder" 'module x y =
+ (cic:/matita/nat/div_and_mod/mod.con x y).
+
let rec div_aux p m n : nat \def
match (leb m n) with
[ true \Rightarrow O
[O \Rightarrow S n
| (S p) \Rightarrow div_aux n n p].
+interpretation "natural divide" 'divide x y =
+ (cic:/matita/nat/div_and_mod/div.con x y).
+
theorem le_mod_aux_m_m:
\forall p,n,m. n \leq p \to (mod_aux p n m) \leq m.
intro.elim p.
apply le_minus_m.apply le_S_S_to_le.assumption.
qed.
-theorem lt_mod_m_m: \forall n,m. O < m \to (mod n m) < m.
+theorem lt_mod_m_m: \forall n,m. O < m \to (n \mod m) < m.
intros 2.elim m.apply False_ind.
apply not_le_Sn_O O H.
simplify.apply le_S_S.apply le_mod_aux_m_m.
apply not_le_to_lt.exact H1.
qed.
-theorem div_mod: \forall n,m:nat. O < m \to n=(div n m)*m+(mod n m).
+theorem div_mod: \forall n,m:nat. O < m \to n=(n / m)*m+(n \mod m).
intros 2.elim m.elim (not_le_Sn_O O H).
simplify.
apply div_aux_mod_aux.
\lambda n,m,q,r:nat.r < m \land n=q*m+r).
*)
-theorem div_mod_spec_to_not_eq_O: \forall n,m,q,r.(div_mod_spec n m q r) \to \lnot m=O.
+theorem div_mod_spec_to_not_eq_O: \forall n,m,q,r.(div_mod_spec n m q r) \to m \neq O.
intros 4.simplify.intros.elim H.absurd le (S r) O.
rewrite < H1.assumption.
exact not_le_Sn_O r.
qed.
theorem div_mod_spec_div_mod:
-\forall n,m. O < m \to (div_mod_spec n m (div n m) (mod n m)).
+\forall n,m. O < m \to (div_mod_spec n m (n / m) (n \mod m)).
intros.
apply div_mod_spec_intro.
apply lt_mod_m_m.assumption.
rewrite < H5.
rewrite < sym_times.
apply plus_to_minus.
-apply eq_plus_to_le ? ? ? H3.
apply H3.
apply le_times_r.
apply lt_to_le.
rewrite < H3.
rewrite < sym_times.
apply plus_to_minus.
-apply eq_plus_to_le ? ? ? H5.
apply H5.
apply le_times_r.
apply lt_to_le.
qed.
(* some properties of div and mod *)
-theorem div_times: \forall n,m:nat. div ((S n)*m) (S n) = m.
+theorem div_times: \forall n,m:nat. ((S n)*m) / (S n) = m.
intros.
apply div_mod_spec_to_eq ((S n)*m) (S n) ? ? ? O.
goal 15. (* ?11 is closed with the following tactics *)
apply div_mod_spec_times.
qed.
-theorem div_n_n: \forall n:nat. O < n \to div n n = S O.
+theorem div_n_n: \forall n:nat. O < n \to n / n = S O.
intros.
-apply div_mod_spec_to_eq n n (div n n) (mod n n) (S O) O.
+apply div_mod_spec_to_eq n n (n / n) (n \mod n) (S O) O.
apply div_mod_spec_div_mod.assumption.
constructor 1.assumption.
rewrite < plus_n_O.simplify.rewrite < plus_n_O.reflexivity.
qed.
-theorem mod_n_n: \forall n:nat. O < n \to mod n n = O.
+theorem eq_div_O: \forall n,m. n < m \to n / m = O.
intros.
-apply div_mod_spec_to_eq2 n n (div n n) (mod n n) (S O) O.
+apply div_mod_spec_to_eq n m (n/m) (n \mod m) O n.
+apply div_mod_spec_div_mod.
+apply le_to_lt_to_lt O n m.
+apply le_O_n.assumption.
+constructor 1.assumption.reflexivity.
+qed.
+
+theorem mod_n_n: \forall n:nat. O < n \to n \mod n = O.
+intros.
+apply div_mod_spec_to_eq2 n n (n / n) (n \mod n) (S O) O.
apply div_mod_spec_div_mod.assumption.
constructor 1.assumption.
rewrite < plus_n_O.simplify.rewrite < plus_n_O.reflexivity.
qed.
-theorem mod_S: \forall n,m:nat. O < m \to S (mod n m) < m \to
-(mod (S n) m) = S (mod n m).
+theorem mod_S: \forall n,m:nat. O < m \to S (n \mod m) < m \to
+((S n) \mod m) = S (n \mod m).
intros.
-apply div_mod_spec_to_eq2 (S n) m (div (S n) m) (mod (S n) m) (div n m) (S (mod n m)).
+apply div_mod_spec_to_eq2 (S n) m ((S n) / m) ((S n) \mod m) (n / m) (S (n \mod m)).
apply div_mod_spec_div_mod.assumption.
constructor 1.assumption.rewrite < plus_n_Sm.
apply eq_f.
assumption.
qed.
-theorem mod_O_n: \forall n:nat.mod O n = O.
+theorem mod_O_n: \forall n:nat.O \mod n = O.
intro.elim n.simplify.reflexivity.
simplify.reflexivity.
qed.
+theorem lt_to_eq_mod:\forall n,m:nat. n < m \to n \mod m = n.
+intros.
+apply div_mod_spec_to_eq2 n m (n/m) (n \mod m) O n.
+apply div_mod_spec_div_mod.
+apply le_to_lt_to_lt O n m.apply le_O_n.assumption.
+constructor 1.
+assumption.reflexivity.
+qed.
(* injectivity *)
theorem injective_times_r: \forall n:nat.injective nat nat (\lambda m:nat.(S n)*m).