intro.apply False_ind.
apply not_eq_true_false.apply sym_eq.assumption.
apply (f_min_aux_true
-(\lambda x. andb (eqb (x \mod m) a) (eqb (x \mod n) b)) (pred (m*n)) (pred (m*n))).
+(\lambda x. andb (eqb (x \mod m) a) (eqb (x \mod n) b)) (pred (m*n)) O).
elim (and_congruent_congruent_lt m n a b).
apply (ex_intro ? ? a1).split.split.
-rewrite < minus_n_n.apply le_O_n.
+apply le_O_n.
elim H3.apply le_S_S_to_le.apply (trans_le ? (m*n)).
assumption.apply (nat_case (m*n)).apply le_O_n.
intro.
-rewrite < pred_Sn.apply le_n.
+rewrite < pred_Sn.
+rewrite < plus_n_O.apply le_n.
elim H3.elim H4.
apply andb_elim.
cut (a1 \mod m = a).
qed.
let rec min_aux off n f \def
- match f (n-off) with
- [ true \Rightarrow (n-off)
+ match f n with
+ [ true \Rightarrow n
| false \Rightarrow
match off with
[ O \Rightarrow n
- | (S p) \Rightarrow min_aux p n f]].
+ | (S p) \Rightarrow min_aux p (S n) f]].
definition min : nat \to (nat \to bool) \to nat \def
-\lambda n.\lambda f. min_aux n n f.
+\lambda n.\lambda f. min_aux n O f.
theorem min_aux_O_f: \forall f:nat \to bool. \forall i :nat.
min_aux O i f = i.
-intros.simplify.rewrite < minus_n_O.
+intros.simplify.
elim (f i).reflexivity.
simplify.reflexivity.
qed.
qed.
theorem min_aux_S : \forall f: nat \to bool. \forall i,n:nat.
-(f (n -(S i)) = true \land min_aux (S i) n f = (n - (S i))) \lor
-(f (n -(S i)) = false \land min_aux (S i) n f = min_aux i n f).
-intros.simplify.elim (f (n - (S i))).
+((f n) = true \land min_aux (S i) n f = n) \lor
+((f n) = false \land min_aux (S i) n f = min_aux i (S n) f).
+intros.simplify.elim (f n).
simplify.left.split.reflexivity.reflexivity.
simplify.right.split.reflexivity.reflexivity.
qed.
theorem f_min_aux_true: \forall f:nat \to bool. \forall off,m:nat.
-(\exists i. le (m-off) i \land le i m \land f i = true) \to
+(\exists i. le m i \land le i (off + m) \land f i = true) \to
f (min_aux off m f) = true.
intros 2.
elim off.elim H.elim H1.elim H2.
cut (a = m).
rewrite > (min_aux_O_f f).rewrite < Hcut.assumption.
-apply (antisym_le a m).assumption.rewrite > (minus_n_O m).assumption.
+apply (antisym_le a m).assumption.assumption.
simplify.
apply (bool_ind (\lambda b:bool.
-(f (m-(S n)) = b) \to (f (match b in bool with
-[ true \Rightarrow m-(S n)
-| false \Rightarrow (min_aux n m f)])) = true)).
-simplify.intro.assumption.
-simplify.intro.apply H.
+(f m = b) \to (f (match b in bool with
+[ true \Rightarrow m
+| false \Rightarrow (min_aux n (S m) f)])) = true)).
+intro; assumption.
+intro. apply H.
elim H1.elim H3.elim H4.
-elim (le_to_or_lt_eq (m-(S n)) a H6).
+elim (le_to_or_lt_eq ? a H6).
apply (ex_intro nat ? a).
split.split.
-apply lt_minus_S_n_to_le_minus_n.assumption.
-assumption.assumption.
+assumption.
+rewrite < plus_n_Sm; assumption.
+assumption.
absurd (f a = false).rewrite < H8.assumption.
rewrite > H5.
apply not_eq_true_false.
qed.
theorem lt_min_aux_to_false : \forall f:nat \to bool.
-\forall n,off,m:nat. (n-off) \leq m \to m < (min_aux off n f) \to f m = false.
+\forall n,off,m:nat. n \leq m \to m < (min_aux off n f) \to f m = false.
intros 3.
-elim off.absurd (le n m).rewrite > minus_n_O.assumption.
-apply lt_to_not_le.rewrite < (min_aux_O_f f n).assumption.
-generalize in match H1.
-elim (min_aux_S f n1 n).
-elim H3.
-absurd (n - S n1 \le m).assumption.
-apply lt_to_not_le.rewrite < H6.assumption.
-elim H3.
-elim (le_to_or_lt_eq (n -(S n1)) m).
-apply H.apply lt_minus_S_n_to_le_minus_n.assumption.
-rewrite < H6.assumption.
-rewrite < H7.assumption.
-assumption.
+generalize in match n; clear n.
+elim off.absurd (le n1 m).assumption.
+apply lt_to_not_le.rewrite < (min_aux_O_f f n1).assumption.
+elim (le_to_or_lt_eq ? ? H1);
+ [ unfold lt in H3;
+ apply (H (S n1));
+ [ assumption
+ | elim (min_aux_S f n n1);
+ [ elim H4;
+ elim (not_le_Sn_n n1);
+ rewrite > H6 in H2;
+ apply (lt_to_le (S n1) n1 ?).
+ apply (le_to_lt_to_lt (S n1) m n1 ? ?);
+ [apply (H3).
+ |apply (H2).
+ ]
+ | elim H4;
+ rewrite < H6;
+ assumption
+ ]
+ ]
+ | rewrite < H3 in H2 ⊢ %.
+ elim (min_aux_S f n n1);
+ [ elim H4;
+ rewrite > H6 in H2;
+ unfold lt in H2;
+ elim (not_le_Sn_n ? H2)
+ | elim H4;
+ assumption
+ ]
+ ]
qed.
-theorem le_min_aux : \forall f:nat \to bool.
-\forall n,off:nat. (n-off) \leq (min_aux off n f).
+
+lemma le_min_aux : \forall f:nat \to bool.
+\forall n,off:nat. n \leq (min_aux off n f).
intros 3.
-elim off.rewrite < minus_n_O.
-rewrite > (min_aux_O_f f n).apply le_n.
-elim (min_aux_S f n1 n).
+generalize in match n. clear n.
+elim off.
+rewrite > (min_aux_O_f f n1).apply le_n.
+elim (min_aux_S f n n1).
elim H1.rewrite > H3.apply le_n.
elim H1.rewrite > H3.
-apply (trans_le (n-(S n1)) (n-n1)).
-apply monotonic_le_minus_r.
-apply le_n_Sn.
-assumption.
+apply (transitive_le ? (S n1));
+ [ apply le_n_Sn
+ | apply (H (S n1))
+ ]
qed.
theorem le_min_aux_r : \forall f:nat \to bool.
-\forall n,off:nat. (min_aux off n f) \le n.
+\forall n,off:nat. (min_aux off n f) \le n+off.
intros.
-elim off.simplify.rewrite < minus_n_O.
-elim (f n).simplify.apply le_n.
-simplify.apply le_n.
-simplify.elim (f (n -(S n1))).
-simplify.apply le_plus_to_minus.
-rewrite < sym_plus.apply le_plus_n.
-simplify.assumption.
-qed.
+generalize in match n. clear n.
+elim off.simplify.
+elim (f n1).simplify.rewrite < plus_n_O.apply le_n.
+simplify.rewrite < plus_n_O.apply le_n.
+simplify.elim (f n1).
+simplify.
+apply (le_plus_n_r (S n) n1).
+simplify.rewrite < plus_n_Sm.
+apply (H (S n1)).
+qed.
\ No newline at end of file
| (S p) \Rightarrow
let previous_prime \def (nth_prime p) in
let upper_bound \def S previous_prime! in
- min_aux (upper_bound - (S previous_prime)) upper_bound primeb].
+ min_aux upper_bound (S previous_prime) primeb].
-(* it works, but nth_prime 4 takes already a few minutes -
-it must compute factorial of 7 ...*)
-
+(* it works
theorem example11 : nth_prime (S(S O)) = (S(S(S(S(S O))))).
normalize.reflexivity.
qed.
normalize.reflexivity.
qed.
-(*
-theorem example14 : nth_prime (S(S(S(S(S O))))) = (S(S(S(S(S(S(S(S(S(S(S O))))))))))).
+alias num (instance 0) = "natural number".
+theorem example14 : nth_prime 18 = 67.
normalize.reflexivity.
-*)
+qed.
+*)
theorem prime_nth_prime : \forall n:nat.prime (nth_prime n).
intro.
change with
(let previous_prime \def (nth_prime m) in
let upper_bound \def S previous_prime! in
-prime (min_aux (upper_bound - (S previous_prime)) upper_bound primeb)).
+prime (min_aux upper_bound (S previous_prime) primeb)).
apply primeb_true_to_prime.
apply f_min_aux_true.
apply (ex_intro nat ? (smallest_factor (S (nth_prime m)!))).
split.split.
-cut (S (nth_prime m)!-(S (nth_prime m)! - (S (nth_prime m))) = (S (nth_prime m))).
-rewrite > Hcut.exact (smallest_factor_fact (nth_prime m)).
-(* maybe we could factorize this proof *)
-apply plus_to_minus.
-apply plus_minus_m_m.
-apply le_S_S.
-apply le_n_fact_n.
-apply le_smallest_factor_n.
+apply smallest_factor_fact.
+apply transitive_le;
+ [2: apply le_smallest_factor_n
+ | skip
+ | apply (le_plus_n_r (S (nth_prime m)) (S (fact (nth_prime m))))
+ ].
apply prime_to_primeb_true.
apply prime_smallest_factor_n.unfold lt.
apply le_S_S.apply le_SO_fact.
change with
(let previous_prime \def (nth_prime n) in
let upper_bound \def S previous_prime! in
-(S previous_prime) \le min_aux (upper_bound - (S previous_prime)) upper_bound primeb).
+(S previous_prime) \le min_aux upper_bound (S previous_prime) primeb).
intros.
-cut (upper_bound - (upper_bound -(S previous_prime)) = (S previous_prime)).
-rewrite < Hcut in \vdash (? % ?).
apply le_min_aux.
-apply plus_to_minus.
-apply plus_minus_m_m.
-apply le_S_S.
-apply le_n_fact_n.
qed.
variant lt_nth_prime_n_nth_prime_Sn :\forall n:nat.
apply primeb_false_to_not_prime.
letin previous_prime \def (nth_prime n).
letin upper_bound \def (S previous_prime!).
-apply (lt_min_aux_to_false primeb upper_bound (upper_bound - (S previous_prime)) m).
-cut (S (nth_prime n)!-(S (nth_prime n)! - (S (nth_prime n))) = (S (nth_prime n))).
-rewrite > Hcut.assumption.
-apply plus_to_minus.
-apply plus_minus_m_m.
-apply le_S_S.
-apply le_n_fact_n.
+apply (lt_min_aux_to_false primeb (S previous_prime) upper_bound m).
assumption.
+unfold lt.
+apply (transitive_le (S m) (nth_prime (S n)) (min_aux (S (fact (nth_prime n))) (S (nth_prime n)) primeb) ? ?);
+ [apply (H1).
+ |apply (le_n (min_aux (S (fact (nth_prime n))) (S (nth_prime n)) primeb)).
+ ]
qed.
(* nth_prime enumerates all primes *)
| (S p) \Rightarrow
match p with
[ O \Rightarrow (S O)
- | (S q) \Rightarrow min_aux q (S(S q)) (\lambda m.(eqb ((S(S q)) \mod m) O))]].
+ | (S q) \Rightarrow min_aux q (S (S O)) (\lambda m.(eqb ((S(S q)) \mod m) O))]].
-(* it works !
-theorem example1 : smallest_prime_factor (S(S(S O))) = (S(S(S O))).
+(* it works !
+theorem example1 : smallest_factor (S(S(S O))) = (S(S(S O))).
normalize.reflexivity.
qed.
-theorem example2: smallest_prime_factor (S(S(S(S O)))) = (S(S O)).
+theorem example2: smallest_factor (S(S(S(S O)))) = (S(S O)).
normalize.reflexivity.
qed.
-theorem example3 : smallest_prime_factor (S(S(S(S(S(S(S O))))))) = (S(S(S(S(S(S(S O))))))).
+theorem example3 : smallest_factor (S(S(S(S(S(S(S O))))))) = (S(S(S(S(S(S(S O))))))).
simplify.reflexivity.
qed. *)
intro.apply (nat_case m).intro. apply False_ind.apply (not_le_Sn_n (S O) H).
intros.
change with
-(S O < min_aux m1 (S(S m1)) (\lambda m.(eqb ((S(S m1)) \mod m) O))).
+(S O < min_aux m1 (S (S O)) (\lambda m.(eqb ((S(S m1)) \mod m) O))).
apply (lt_to_le_to_lt ? (S (S O))).
apply (le_n (S(S O))).
cut ((S(S O)) = (S(S m1)) - m1).
intros.
apply divides_b_true_to_divides.
change with
-(eqb ((S(S m1)) \mod (min_aux m1 (S(S m1))
+(eqb ((S(S m1)) \mod (min_aux m1 (S (S O))
(\lambda m.(eqb ((S(S m1)) \mod m) O)))) O = true).
apply f_min_aux_true.
apply (ex_intro nat ? (S(S m1))).
split.split.
-apply le_minus_m.apply le_n.
-rewrite > mod_n_n.reflexivity.
-apply (trans_lt ? (S O)).apply (le_n (S O)).unfold lt.
-apply le_S_S.apply le_S_S.apply le_O_n.
+apply (le_S_S_to_le (S (S O)) (S (S m1)) ?).
+apply (minus_le_O_to_le (S (S (S O))) (S (S (S m1))) ?).
+apply (le_n O).
+rewrite < sym_plus. simplify. apply le_n.
+apply (eq_to_eqb_true (mod (S (S m1)) (S (S m1))) O ?).
+apply (mod_n_n (S (S m1)) ?).
+apply (H).
qed.
theorem le_smallest_factor_n :
intros.
apply divides_b_false_to_not_divides.
apply (lt_min_aux_to_false
-(\lambda i:nat.eqb ((S(S m1)) \mod i) O) (S(S m1)) m1 i).
-cut ((S(S O)) = (S(S m1)-m1)).
-rewrite < Hcut.exact H1.
-apply sym_eq. apply plus_to_minus.
-rewrite < sym_plus.simplify.reflexivity.
-exact H2.
+(\lambda i:nat.eqb ((S(S m1)) \mod i) O) (S (S O)) m1 i).
+assumption.
+assumption.
qed.
theorem prime_smallest_factor_n :
[intros.unfold cr_pair.
apply (le_to_lt_to_lt ? (pred ((S m2)*(S m1))))
[unfold min.
- apply le_min_aux_r
+ apply transitive_le;
+ [2: apply le_min_aux_r | skip | apply le_n]
|unfold lt.
apply (nat_case ((S m2)*(S m1)))
[apply le_n|intro.apply le_n]
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