match n with
[ O ⇒ 1
| S m ⇒ fact m * S m].
-
+
interpretation "factorial" 'fact n = (fact n).
+lemma factS: ∀n. (S n)! = (S n)*n!.
+#n >commutative_times // qed.
+
theorem le_1_fact : ∀n. 1 ≤ n!.
-#n (elim n) normalize /2/
+#n (elim n) normalize /2 by lt_minus_to_plus/
qed.
theorem le_2_fact : ∀n. 1 < n → 2 ≤ n!.
#n (cases n)
[#H @False_ind /2/
|#m #lt2 normalize @(lt_to_le_to_lt ? (2*(S m))) //
- @le_times // @le_2_fact /2/
+ @le_times // @le_2_fact /2 by lt_plus_to_lt_l/
qed.
(* approximations *)
@(transitive_le ? ((2^(pred (2*n))) * n! * n! *(2*(S n))*(2*(S n))))
[@le_times[@le_times //]//
(* we generalize to hide the computational content *)
- |normalize in match ((S n)!) generalize in match (S n)
- #Sn generalize in match 2 #two //
+ |normalize in match ((S n)!); generalize in match (S n);
+ #Sn generalize in match 2; #two //
]
]
qed.
#n #posn #Hind (cut (∀i.2*(S i) = S(S(2*i)))) [//] #H
cut (2^(2*(S n)) = 2^(2*n)*2*2) [>H //] #H1 >H1
@(le_to_lt_to_lt ? (2^(2*n)*n!*n!*(2*(S n))*(2*(S n))))
- [normalize in match ((S n)!) generalize in match (S n) #Sn
- generalize in match 2 #two //
+ [normalize in match ((S n)!); generalize in match (S n); #Sn
+ generalize in match 2; #two //
|cut ((S(2*(S n)))! = (S(2*n))!*(S(S(2*n)))*(S(S(S(2*n)))))
[>H //] #H2 >H2 @lt_to_le_to_lt_times
[@lt_to_le_to_lt_times //|>H // | //]
]
qed.
-
-(* a slightly better result
-theorem fact3: \forall n.O < n \to
-(exp 2 (2*n))*(exp (fact n) 2) \le 2*n*fact (2*n).
-intros.
-elim H
- [simplify.apply le_n
- |rewrite > times_SSO.
- rewrite > factS.
- rewrite < times_exp.
- change in ⊢ (? (? % ?) ?) with ((S(S O))*((S(S O))*(exp (S(S O)) ((S(S O))*n1)))).
- rewrite > assoc_times.
- rewrite > assoc_times in ⊢ (? (? ? %) ?).
- rewrite < assoc_times in ⊢ (? (? ? (? ? %)) ?).
- rewrite < sym_times in ⊢ (? (? ? (? ? (? % ?))) ?).
- rewrite > assoc_times in ⊢ (? (? ? (? ? %)) ?).
- apply (trans_le ? (((S(S O))*((S(S O))*((S n1)\sup((S(S O)))*((S(S O))*n1*((S(S O))*n1)!))))))
- [apply le_times_r.
- apply le_times_r.
- apply le_times_r.
- assumption
- |rewrite > factS.
- rewrite > factS.
- rewrite < times_SSO.
- rewrite > assoc_times in ⊢ (? ? %).
- apply le_times_r.
- rewrite < assoc_times.
- change in ⊢ (? (? (? ? %) ?) ?) with ((S n1)*((S n1)*(S O))).
- rewrite < assoc_times in ⊢ (? (? % ?) ?).
- rewrite < times_n_SO.
- rewrite > sym_times in ⊢ (? (? (? % ?) ?) ?).
- rewrite < assoc_times in ⊢ (? ? %).
- rewrite < assoc_times in ⊢ (? ? (? % ?)).
- apply le_times_r.
- apply le_times_l.
- apply le_S.apply le_n
+
+(* a sligtly better result *)
+theorem exp_to_fact2: ∀n.O < n →
+ (exp 2 (2*n))*(exp (fact n) 2) \le 2*n*fact (2*n).
+#n #posn elim posn
+ [@le_n
+ |#m #le1m #Hind
+ cut (2*(S m) = S(S (2*m))) [normalize //] #H2 >H2 in ⊢ (?%?);
+ >factS <times_exp
+ whd in match (exp 2 (S(S ?))); >(commutative_times ? 2) >associative_times
+ >associative_times in ⊢ (??%); @monotonic_le_times_r
+ whd in match (exp 2 (S ?)); >(commutative_times ? 2) >associative_times
+ @(transitive_le ? (2*((2*m*(2*m)!)*(S m)^2)))
+ [@le_times [//] >commutative_times in ⊢ (?(??%)?); <associative_times
+ @le_times [@Hind |@le_n]
+ |>exp_2 <associative_times <associative_times >commutative_times in ⊢ (??%);
+ @le_times [2:@le_n] >H2 >factS >commutative_times <associative_times
+ @le_times //
]
]
qed.
-theorem le_fact_10: fact (2*5) \le (exp 2 ((2*5)-2))*(fact 5)*(fact 5).
-simplify in \vdash (? (? %) ?).
-rewrite > factS in \vdash (? % ?).
-rewrite > factS in \vdash (? % ?).rewrite < assoc_times in \vdash(? % ?).
-rewrite > factS in \vdash (? % ?).rewrite < assoc_times in \vdash (? % ?).
-rewrite > factS in \vdash (? % ?).rewrite < assoc_times in \vdash (? % ?).
-rewrite > factS in \vdash (? % ?).rewrite < assoc_times in \vdash (? % ?).
-apply le_times_l.
-apply leb_true_to_le.reflexivity.
-qed.
+theorem le_fact_10: fact (2*5) ≤ (exp 2 ((2*5)-2))*(fact 5)*(fact 5).
+>factS in ⊢ (?%?); >factS in ⊢ (?%?); <associative_times in ⊢ (?%?);
+>factS in ⊢ (?%?); <associative_times in ⊢ (?%?);
+>factS in ⊢ (?%?); <associative_times in ⊢ (?%?);
+>factS in ⊢ (?%?); <associative_times in ⊢ (?%?);
+@le_times [2:%] @leb_true_to_le %
+qed-.
-theorem ab_times_cd: \forall a,b,c,d.(a*b)*(c*d)=(a*c)*(b*d).
-intros.
-rewrite > assoc_times.
-rewrite > assoc_times.
-apply eq_f.
-rewrite < assoc_times.
-rewrite < assoc_times.
-rewrite > sym_times in \vdash (? ? (? % ?) ?).
-reflexivity.
+theorem ab_times_cd: ∀a,b,c,d.(a*b)*(c*d)=(a*c)*(b*d).
+//
qed.
(* an even better result *)
-theorem lt_SSSSO_to_fact: \forall n.4<n \to
-fact (2*n) \le (exp 2 ((2*n)-2))*(fact n)*(fact n).
-intros.elim H
- [apply le_fact_10
- |rewrite > times_SSO.
- change in \vdash (? ? (? (? (? ? %) ?) ?)) with (2*n1 - O);
- rewrite < minus_n_O.
- rewrite > factS.
- rewrite > factS.
- rewrite < assoc_times.
- rewrite > factS.
- apply (trans_le ? ((2*(S n1))*(2*(S n1))*(fact (2*n1))))
- [apply le_times_l.
- rewrite > times_SSO.
- apply le_times_r.
- apply le_n_Sn
- |apply (trans_le ? (2*S n1*(2*S n1)*(2\sup(2*n1-2)*n1!*n1!)))
- [apply le_times_r.assumption
- |rewrite > assoc_times.
- rewrite > ab_times_cd in \vdash (? (? ? %) ?).
- rewrite < assoc_times.
- apply le_times_l.
- rewrite < assoc_times in \vdash (? (? ? %) ?).
- rewrite > ab_times_cd.
- apply le_times_l.
- rewrite < exp_S.
- rewrite < exp_S.
- apply le_exp
- [apply lt_O_S
- |rewrite > eq_minus_S_pred.
- rewrite < S_pred
- [rewrite > eq_minus_S_pred.
- rewrite < S_pred
- [rewrite < minus_n_O.
- apply le_n
- |elim H1;simplify
- [apply lt_O_S
- |apply lt_O_S
- ]
- ]
- |elim H1;simplify
- [apply lt_O_S
- |rewrite < plus_n_Sm.
- rewrite < minus_n_O.
- apply lt_O_S
- ]
- ]
+theorem lt_4_to_fact: ∀n.4<n →
+ fact (2*n) ≤ (exp 2 ((2*n)-2))*(fact n)*(fact n).
+#n #ltn elim ltn
+ [@le_fact_10
+ |#m #lem #Hind
+ cut (2*(S m) = S(S (2*m))) [normalize //] #H2 >H2
+ whd in match (minus (S(S ?)) 2); <minus_n_O
+ >factS >factS <associative_times >factS
+ @(transitive_le ? ((2*(S m))*(2*(S m))*(fact (2*m))))
+ [@le_times [2:@le_n] >H2 @le_times //
+ |@(transitive_le ? (2*S m*(2*S m)*(2\sup(2*m-2)*m!*m!)))
+ [@monotonic_le_times_r //
+ |>associative_times >ab_times_cd in ⊢ (?(??%)?);
+ <associative_times @le_times [2:@le_n]
+ <associative_times in ⊢ (?(??%)?);
+ >ab_times_cd @le_times [2:@le_n] >commutative_times
+ >(commutative_times 2) @(le_exp (S(S ((2*m)-2)))) [//]
+ >eq_minus_S_pred >S_pred
+ [>eq_minus_S_pred >S_pred [<minus_n_O @le_n |elim lem //]
+ |elim lem [//] #m0 #le5m0 #Hind
+ normalize <plus_n_Sm //
]
]
]
]
-qed. *)
+qed.