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(************************************************************************)
(* v * The Coq Proof Assistant / The Coq Development Team *)
(* <O___,, * INRIA - CNRS - LIX - LRI - PPS - Copyright 1999-2012 *)
(* \VV/ **************************************************************)
(* // * This file is distributed under the terms of the *)
(* * GNU Lesser General Public License Version 2.1 *)
(************************************************************************)
Require Import Rbase.
Require Import Rfunctions.
Require Import Rseries.
Require Import PartSum.
Local Open Scope R_scope.
(**********)
Lemma sum_N_predN :
forall (An:nat -> R) (N:nat),
(0 < N)%nat -> sum_f_R0 An N = sum_f_R0 An (pred N) + An N.
Proof.
intros.
replace N with (S (pred N)).
rewrite tech5.
reflexivity.
symmetry ; apply S_pred with 0%nat; assumption.
Qed.
(**********)
Lemma sum_plus :
forall (An Bn:nat -> R) (N:nat),
sum_f_R0 (fun l:nat => An l + Bn l) N = sum_f_R0 An N + sum_f_R0 Bn N.
Proof.
intros.
induction N as [| N HrecN].
reflexivity.
do 3 rewrite tech5.
rewrite HrecN; ring.
Qed.
(* The main result *)
Theorem cauchy_finite :
forall (An Bn:nat -> R) (N:nat),
(0 < N)%nat ->
sum_f_R0 An N * sum_f_R0 Bn N =
sum_f_R0 (fun k:nat => sum_f_R0 (fun p:nat => An p * Bn (k - p)%nat) k) N +
sum_f_R0
(fun k:nat =>
sum_f_R0 (fun l:nat => An (S (l + k)) * Bn (N - l)%nat)
(pred (N - k))) (pred N).
Proof.
intros; induction N as [| N HrecN].
elim (lt_irrefl _ H).
cut (N = 0%nat \/ (0 < N)%nat).
intro; elim H0; intro.
rewrite H1; simpl; ring.
replace (pred (S N)) with (S (pred N)).
do 5 rewrite tech5.
rewrite Rmult_plus_distr_r; rewrite Rmult_plus_distr_l; rewrite (HrecN H1).
repeat rewrite Rplus_assoc; apply Rplus_eq_compat_l.
replace (pred (S N - S (pred N))) with 0%nat.
rewrite Rmult_plus_distr_l;
replace
(sum_f_R0 (fun l:nat => An (S (l + S (pred N))) * Bn (S N - l)%nat) 0) with
(An (S N) * Bn (S N)).
repeat rewrite <- Rplus_assoc;
do 2 rewrite <- (Rplus_comm (An (S N) * Bn (S N)));
repeat rewrite Rplus_assoc; apply Rplus_eq_compat_l.
rewrite <- minus_n_n; cut (N = 1%nat \/ (2 <= N)%nat).
intro; elim H2; intro.
rewrite H3; simpl; ring.
replace
(sum_f_R0
(fun k:nat =>
sum_f_R0 (fun l:nat => An (S (l + k)) * Bn (N - l)%nat) (pred (N - k)))
(pred N)) with
(sum_f_R0
(fun k:nat =>
sum_f_R0 (fun l:nat => An (S (S (l + k))) * Bn (N - l)%nat)
(pred (pred (N - k)))) (pred (pred N)) +
sum_f_R0 (fun l:nat => An (S l) * Bn (N - l)%nat) (pred N)).
replace (sum_f_R0 (fun p:nat => An p * Bn (S N - p)%nat) N) with
(sum_f_R0 (fun l:nat => An (S l) * Bn (N - l)%nat) (pred N) +
An 0%nat * Bn (S N)).
repeat rewrite <- Rplus_assoc;
rewrite <-
(Rplus_comm (sum_f_R0 (fun l:nat => An (S l) * Bn (N - l)%nat) (pred N)))
; repeat rewrite Rplus_assoc; apply Rplus_eq_compat_l.
replace
(sum_f_R0
(fun k:nat =>
sum_f_R0 (fun l:nat => An (S (l + k)) * Bn (S N - l)%nat)
(pred (S N - k))) (pred N)) with
(sum_f_R0
(fun k:nat =>
sum_f_R0 (fun l:nat => An (S (S (l + k))) * Bn (N - l)%nat)
(pred (N - k))) (pred N) +
Bn (S N) * sum_f_R0 (fun l:nat => An (S l)) (pred N)).
rewrite (decomp_sum An N H1); rewrite Rmult_plus_distr_r;
repeat rewrite <- Rplus_assoc; rewrite <- (Rplus_comm (An 0%nat * Bn (S N)));
repeat rewrite Rplus_assoc; apply Rplus_eq_compat_l.
repeat rewrite <- Rplus_assoc;
rewrite <-
(Rplus_comm (sum_f_R0 (fun i:nat => An (S i)) (pred N) * Bn (S N)))
;
rewrite <-
(Rplus_comm (Bn (S N) * sum_f_R0 (fun i:nat => An (S i)) (pred N)))
; rewrite (Rmult_comm (Bn (S N))); repeat rewrite Rplus_assoc;
apply Rplus_eq_compat_l.
replace
(sum_f_R0
(fun k:nat =>
sum_f_R0 (fun l:nat => An (S (S (l + k))) * Bn (N - l)%nat)
(pred (N - k))) (pred N)) with
(sum_f_R0
(fun k:nat =>
sum_f_R0 (fun l:nat => An (S (S (l + k))) * Bn (N - l)%nat)
(pred (pred (N - k)))) (pred (pred N)) +
An (S N) * sum_f_R0 (fun l:nat => Bn (S l)) (pred N)).
rewrite (decomp_sum Bn N H1); rewrite Rmult_plus_distr_l.
set
(Z :=
sum_f_R0
(fun k:nat =>
sum_f_R0 (fun l:nat => An (S (S (l + k))) * Bn (N - l)%nat)
(pred (pred (N - k)))) (pred (pred N)));
set (Z2 := sum_f_R0 (fun i:nat => Bn (S i)) (pred N));
ring.
rewrite
(sum_N_predN
(fun k:nat =>
sum_f_R0 (fun l:nat => An (S (S (l + k))) * Bn (N - l)%nat)
(pred (N - k))) (pred N)).
replace
(sum_f_R0
(fun k:nat =>
sum_f_R0 (fun l:nat => An (S (S (l + k))) * Bn (N - l)%nat)
(pred (N - k))) (pred (pred N))) with
(sum_f_R0
(fun k:nat =>
sum_f_R0 (fun l:nat => An (S (S (l + k))) * Bn (N - l)%nat)
(pred (pred (N - k))) + An (S N) * Bn (S k)) (
pred (pred N))).
rewrite
(sum_plus
(fun k:nat =>
sum_f_R0 (fun l:nat => An (S (S (l + k))) * Bn (N - l)%nat)
(pred (pred (N - k)))) (fun k:nat => An (S N) * Bn (S k))
(pred (pred N))).
repeat rewrite Rplus_assoc; apply Rplus_eq_compat_l.
replace (pred (N - pred N)) with 0%nat.
simpl; rewrite <- minus_n_O.
replace (S (pred N)) with N.
replace (sum_f_R0 (fun k:nat => An (S N) * Bn (S k)) (pred (pred N))) with
(sum_f_R0 (fun k:nat => Bn (S k) * An (S N)) (pred (pred N))).
rewrite <- (scal_sum (fun l:nat => Bn (S l)) (pred (pred N)) (An (S N)));
rewrite (sum_N_predN (fun l:nat => Bn (S l)) (pred N)).
replace (S (pred N)) with N.
ring.
apply S_pred with 0%nat; assumption.
apply lt_pred; apply lt_le_trans with 2%nat; [ apply lt_n_Sn | assumption ].
apply sum_eq; intros; apply Rmult_comm.
apply S_pred with 0%nat; assumption.
replace (N - pred N)%nat with 1%nat.
reflexivity.
pattern N at 1; replace N with (S (pred N)).
rewrite <- minus_Sn_m.
rewrite <- minus_n_n; reflexivity.
apply le_n.
symmetry ; apply S_pred with 0%nat; assumption.
apply sum_eq; intros;
rewrite
(sum_N_predN (fun l:nat => An (S (S (l + i))) * Bn (N - l)%nat)
(pred (N - i))).
replace (S (S (pred (N - i) + i))) with (S N).
replace (N - pred (N - i))%nat with (S i).
reflexivity.
rewrite pred_of_minus; apply INR_eq; repeat rewrite minus_INR.
rewrite S_INR; simpl; ring.
apply le_trans with (pred (pred N)).
assumption.
apply le_trans with (pred N); apply le_pred_n.
apply INR_le; rewrite minus_INR.
apply Rplus_le_reg_l with (INR i - 1).
replace (INR i - 1 + INR 1) with (INR i); [ idtac | simpl; ring ].
replace (INR i - 1 + (INR N - INR i)) with (INR N - INR 1);
[ idtac | simpl; ring ].
rewrite <- minus_INR.
apply le_INR; apply le_trans with (pred (pred N)).
assumption.
rewrite <- pred_of_minus; apply le_pred_n.
apply le_trans with 2%nat.
apply le_n_Sn.
assumption.
apply le_trans with (pred (pred N)).
assumption.
apply le_trans with (pred N); apply le_pred_n.
rewrite <- pred_of_minus.
apply le_trans with (pred N).
apply le_S_n.
replace (S (pred N)) with N.
replace (S (pred (N - i))) with (N - i)%nat.
apply (fun p n m:nat => plus_le_reg_l n m p) with i; rewrite le_plus_minus_r.
apply le_plus_r.
apply le_trans with (pred (pred N));
[ assumption | apply le_trans with (pred N); apply le_pred_n ].
apply S_pred with 0%nat.
apply plus_lt_reg_l with i; rewrite le_plus_minus_r.
replace (i + 0)%nat with i; [ idtac | ring ].
apply le_lt_trans with (pred (pred N));
[ assumption | apply lt_trans with (pred N); apply lt_pred_n_n ].
apply lt_S_n.
replace (S (pred N)) with N.
apply lt_le_trans with 2%nat.
apply lt_n_Sn.
assumption.
apply S_pred with 0%nat; assumption.
assumption.
apply le_trans with (pred (pred N)).
assumption.
apply le_trans with (pred N); apply le_pred_n.
apply S_pred with 0%nat; assumption.
apply le_pred_n.
apply INR_eq; rewrite pred_of_minus; do 3 rewrite S_INR; rewrite plus_INR;
repeat rewrite minus_INR.
simpl; ring.
apply le_trans with (pred (pred N)).
assumption.
apply le_trans with (pred N); apply le_pred_n.
apply INR_le.
rewrite minus_INR.
apply Rplus_le_reg_l with (INR i - 1).
replace (INR i - 1 + INR 1) with (INR i); [ idtac | simpl; ring ].
replace (INR i - 1 + (INR N - INR i)) with (INR N - INR 1);
[ idtac | simpl; ring ].
rewrite <- minus_INR.
apply le_INR.
apply le_trans with (pred (pred N)).
assumption.
rewrite <- pred_of_minus.
apply le_pred_n.
apply le_trans with 2%nat.
apply le_n_Sn.
assumption.
apply le_trans with (pred (pred N)).
assumption.
apply le_trans with (pred N); apply le_pred_n.
apply lt_le_trans with 1%nat.
apply lt_O_Sn.
apply INR_le.
rewrite pred_of_minus.
repeat rewrite minus_INR.
apply Rplus_le_reg_l with (INR i - 1).
replace (INR i - 1 + INR 1) with (INR i); [ idtac | simpl; ring ].
replace (INR i - 1 + (INR N - INR i - INR 1)) with (INR N - INR 1 - INR 1).
repeat rewrite <- minus_INR.
apply le_INR.
apply le_trans with (pred (pred N)).
assumption.
do 2 rewrite <- pred_of_minus.
apply le_n.
apply (fun p n m:nat => plus_le_reg_l n m p) with 1%nat.
rewrite le_plus_minus_r.
simpl; assumption.
apply le_trans with 2%nat; [ apply le_n_Sn | assumption ].
apply le_trans with 2%nat; [ apply le_n_Sn | assumption ].
simpl; ring.
apply le_trans with (pred (pred N)).
assumption.
apply le_trans with (pred N); apply le_pred_n.
apply (fun p n m:nat => plus_le_reg_l n m p) with i.
rewrite le_plus_minus_r.
replace (i + 1)%nat with (S i).
replace N with (S (pred N)).
apply le_n_S.
apply le_trans with (pred (pred N)).
assumption.
apply le_pred_n.
symmetry ; apply S_pred with 0%nat; assumption.
apply INR_eq; rewrite S_INR; rewrite plus_INR; reflexivity.
apply le_trans with (pred (pred N)).
assumption.
apply le_trans with (pred N); apply le_pred_n.
apply lt_le_trans with 1%nat.
apply lt_O_Sn.
apply le_S_n.
replace (S (pred N)) with N.
assumption.
apply S_pred with 0%nat; assumption.
replace
(sum_f_R0
(fun k:nat =>
sum_f_R0 (fun l:nat => An (S (l + k)) * Bn (S N - l)%nat)
(pred (S N - k))) (pred N)) with
(sum_f_R0
(fun k:nat =>
sum_f_R0 (fun l:nat => An (S (S (l + k))) * Bn (N - l)%nat)
(pred (N - k)) + An (S k) * Bn (S N)) (pred N)).
rewrite
(sum_plus
(fun k:nat =>
sum_f_R0 (fun l:nat => An (S (S (l + k))) * Bn (N - l)%nat)
(pred (N - k))) (fun k:nat => An (S k) * Bn (S N))).
apply Rplus_eq_compat_l.
rewrite scal_sum; reflexivity.
apply sum_eq; intros; rewrite Rplus_comm;
rewrite
(decomp_sum (fun l:nat => An (S (l + i)) * Bn (S N - l)%nat)
(pred (S N - i))).
replace (0 + i)%nat with i; [ idtac | ring ].
rewrite <- minus_n_O; apply Rplus_eq_compat_l.
replace (pred (pred (S N - i))) with (pred (N - i)).
apply sum_eq; intros.
replace (S N - S i0)%nat with (N - i0)%nat; [ idtac | reflexivity ].
replace (S i0 + i)%nat with (S (i0 + i)).
reflexivity.
apply INR_eq; rewrite S_INR; do 2 rewrite plus_INR; rewrite S_INR; simpl; ring.
cut ((N - i)%nat = pred (S N - i)).
intro; rewrite H5; reflexivity.
rewrite pred_of_minus.
apply INR_eq; repeat rewrite minus_INR.
rewrite S_INR; simpl; ring.
apply le_trans with N.
apply le_trans with (pred N).
assumption.
apply le_pred_n.
apply le_n_Sn.
apply (fun p n m:nat => plus_le_reg_l n m p) with i.
rewrite le_plus_minus_r.
replace (i + 1)%nat with (S i).
apply le_n_S.
apply le_trans with (pred N).
assumption.
apply le_pred_n.
apply INR_eq; rewrite S_INR; rewrite plus_INR; simpl; ring.
apply le_trans with N.
apply le_trans with (pred N).
assumption.
apply le_pred_n.
apply le_n_Sn.
apply le_trans with (pred N).
assumption.
apply le_pred_n.
replace (pred (S N - i)) with (S N - S i)%nat.
replace (S N - S i)%nat with (N - i)%nat; [ idtac | reflexivity ].
apply plus_lt_reg_l with i.
rewrite le_plus_minus_r.
replace (i + 0)%nat with i; [ idtac | ring ].
apply le_lt_trans with (pred N).
assumption.
apply lt_pred_n_n.
assumption.
apply le_trans with (pred N).
assumption.
apply le_pred_n.
rewrite pred_of_minus.
apply INR_eq; repeat rewrite minus_INR.
repeat rewrite S_INR; simpl; ring.
apply le_trans with N.
apply le_trans with (pred N).
assumption.
apply le_pred_n.
apply le_n_Sn.
apply (fun p n m:nat => plus_le_reg_l n m p) with i.
rewrite le_plus_minus_r.
replace (i + 1)%nat with (S i).
apply le_n_S.
apply le_trans with (pred N).
assumption.
apply le_pred_n.
apply INR_eq; rewrite S_INR; rewrite plus_INR; simpl; ring.
apply le_trans with N.
apply le_trans with (pred N).
assumption.
apply le_pred_n.
apply le_n_Sn.
apply le_n_S.
apply le_trans with (pred N).
assumption.
apply le_pred_n.
rewrite Rplus_comm.
rewrite (decomp_sum (fun p:nat => An p * Bn (S N - p)%nat) N).
rewrite <- minus_n_O.
apply Rplus_eq_compat_l.
apply sum_eq; intros.
reflexivity.
assumption.
rewrite Rplus_comm.
rewrite
(decomp_sum
(fun k:nat =>
sum_f_R0 (fun l:nat => An (S (l + k)) * Bn (N - l)%nat) (pred (N - k)))
(pred N)).
rewrite <- minus_n_O.
replace (sum_f_R0 (fun l:nat => An (S (l + 0)) * Bn (N - l)%nat) (pred N))
with (sum_f_R0 (fun l:nat => An (S l) * Bn (N - l)%nat) (pred N)).
apply Rplus_eq_compat_l.
apply sum_eq; intros.
replace (pred (N - S i)) with (pred (pred (N - i))).
apply sum_eq; intros.
replace (i0 + S i)%nat with (S (i0 + i)).
reflexivity.
apply INR_eq; rewrite S_INR; do 2 rewrite plus_INR; rewrite S_INR; simpl; ring.
cut (pred (N - i) = (N - S i)%nat).
intro; rewrite H5; reflexivity.
rewrite pred_of_minus.
apply INR_eq.
repeat rewrite minus_INR.
repeat rewrite S_INR; simpl; ring.
apply le_trans with (S (pred (pred N))).
apply le_n_S; assumption.
replace (S (pred (pred N))) with (pred N).
apply le_pred_n.
apply S_pred with 0%nat.
apply lt_S_n.
replace (S (pred N)) with N.
apply lt_le_trans with 2%nat.
apply lt_n_Sn.
assumption.
apply S_pred with 0%nat; assumption.
apply le_trans with (pred (pred N)).
assumption.
apply le_trans with (pred N); apply le_pred_n.
apply (fun p n m:nat => plus_le_reg_l n m p) with i.
rewrite le_plus_minus_r.
replace (i + 1)%nat with (S i).
replace N with (S (pred N)).
apply le_n_S.
apply le_trans with (pred (pred N)).
assumption.
apply le_pred_n.
symmetry ; apply S_pred with 0%nat; assumption.
apply INR_eq; rewrite S_INR; rewrite plus_INR; simpl; ring.
apply le_trans with (pred (pred N)).
assumption.
apply le_trans with (pred N); apply le_pred_n.
apply sum_eq; intros.
replace (i + 0)%nat with i; [ reflexivity | trivial ].
apply lt_S_n.
replace (S (pred N)) with N.
apply lt_le_trans with 2%nat; [ apply lt_n_Sn | assumption ].
apply S_pred with 0%nat; assumption.
inversion H1.
left; reflexivity.
right; apply le_n_S; assumption.
simpl.
replace (S (pred N)) with N.
reflexivity.
apply S_pred with 0%nat; assumption.
simpl.
cut ((N - pred N)%nat = 1%nat).
intro; rewrite H2; reflexivity.
rewrite pred_of_minus.
apply INR_eq; repeat rewrite minus_INR.
simpl; ring.
apply lt_le_S; assumption.
rewrite <- pred_of_minus; apply le_pred_n.
simpl; symmetry ; apply S_pred with 0%nat; assumption.
inversion H.
left; reflexivity.
right; apply lt_le_trans with 1%nat; [ apply lt_n_Sn | exact H1 ].
Qed.
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