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(************************************************************************)
(*  v      *   The Coq Proof Assistant  /  The Coq Development Team     *)
(* <O___,, *   INRIA - CNRS - LIX - LRI - PPS - Copyright 1999-2016     *)
(*   \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 SeqSeries.
Local Open Scope R_scope.

(*****************************************************************)
(**           To define transcendental functions                 *)
(**           and exponential function                           *)
(*****************************************************************)

(*********)
Lemma Alembert_exp :
  Un_cv (fun n:nat => Rabs (/ INR (fact (S n)) * / / INR (fact n))) 0.
Proof.
  unfold Un_cv; intros; destruct (Rgt_dec eps 1) as [Hgt|Hnotgt].
  - split with 0%nat; intros; rewrite (simpl_fact n); unfold R_dist;
      rewrite (Rminus_0_r (Rabs (/ INR (S n))));
        rewrite (Rabs_Rabsolu (/ INR (S n))); cut (/ INR (S n) > 0).
    intro; rewrite (Rabs_pos_eq (/ INR (S n))).
    cut (/ eps - 1 < 0).
    intro H2; generalize (Rlt_le_trans (/ eps - 1) 0 (INR n) H2 (pos_INR n));
      clear H2; intro; unfold Rminus in H2;
        generalize (Rplus_lt_compat_l 1 (/ eps + -1) (INR n) H2);
          replace (1 + (/ eps + -1)) with (/ eps); [ clear H2; intro | ring ].
    rewrite (Rplus_comm 1 (INR n)) in H2; rewrite <- (S_INR n) in H2;
      generalize (Rmult_gt_0_compat (/ INR (S n)) eps H1 H);
        intro; unfold Rgt in H3;
          generalize (Rmult_lt_compat_l (/ INR (S n) * eps) (/ eps) (INR (S n)) H3 H2);
            intro; rewrite (Rmult_assoc (/ INR (S n)) eps (/ eps)) in H4;
              rewrite (Rinv_r eps (Rlt_dichotomy_converse eps 0 (or_intror (eps < 0) H)))
                in H4; rewrite (let (H1, H2) := Rmult_ne (/ INR (S n)) in H1) in H4;
                  rewrite (Rmult_comm (/ INR (S n))) in H4;
                    rewrite (Rmult_assoc eps (/ INR (S n)) (INR (S n))) in H4;
                      rewrite (Rinv_l (INR (S n)) (not_O_INR (S n) (not_eq_sym (O_S n)))) in H4;
                        rewrite (let (H1, H2) := Rmult_ne eps in H1) in H4;
                          assumption.
    apply Rlt_minus; unfold Rgt in Hgt; rewrite <- Rinv_1;
      apply (Rinv_lt_contravar 1 eps); auto;
        rewrite (let (H1, H2) := Rmult_ne eps in H2); unfold Rgt in H;
          assumption.
    unfold Rgt in H1; apply Rlt_le; assumption.
    unfold Rgt; apply Rinv_0_lt_compat; apply lt_INR_0; apply lt_O_Sn.
  - cut (0 <= up (/ eps - 1))%Z.
    intro; elim (IZN (up (/ eps - 1)) H0); intros; split with x; intros;
      rewrite (simpl_fact n); unfold R_dist;
        rewrite (Rminus_0_r (Rabs (/ INR (S n))));
          rewrite (Rabs_Rabsolu (/ INR (S n))); cut (/ INR (S n) > 0).
    intro; rewrite (Rabs_pos_eq (/ INR (S n))).
    cut (/ eps - 1 < INR x).
    intro ;
      generalize
        (Rlt_le_trans (/ eps - 1) (INR x) (INR n) H4
          (le_INR x n H2));
        clear H4; intro; unfold Rminus in H4;
          generalize (Rplus_lt_compat_l 1 (/ eps + -1) (INR n) H4);
            replace (1 + (/ eps + -1)) with (/ eps); [ clear H4; intro | ring ].
    rewrite (Rplus_comm 1 (INR n)) in H4; rewrite <- (S_INR n) in H4;
      generalize (Rmult_gt_0_compat (/ INR (S n)) eps H3 H);
        intro; unfold Rgt in H5;
          generalize (Rmult_lt_compat_l (/ INR (S n) * eps) (/ eps) (INR (S n)) H5 H4);
            intro; rewrite (Rmult_assoc (/ INR (S n)) eps (/ eps)) in H6;
              rewrite (Rinv_r eps (Rlt_dichotomy_converse eps 0 (or_intror (eps < 0) H)))
                in H6; rewrite (let (H1, H2) := Rmult_ne (/ INR (S n)) in H1) in H6;
                  rewrite (Rmult_comm (/ INR (S n))) in H6;
                    rewrite (Rmult_assoc eps (/ INR (S n)) (INR (S n))) in H6;
                      rewrite (Rinv_l (INR (S n)) (not_O_INR (S n) (not_eq_sym (O_S n)))) in H6;
                        rewrite (let (H1, H2) := Rmult_ne eps in H1) in H6;
                          assumption.
    cut (IZR (up (/ eps - 1)) = IZR (Z.of_nat x));
      [ intro | rewrite H1; trivial ].
    elim (archimed (/ eps - 1)); intros; clear H6; unfold Rgt in H5;
      rewrite H4 in H5; rewrite INR_IZR_INZ; assumption.
    unfold Rgt in H1; apply Rlt_le; assumption.
    unfold Rgt; apply Rinv_0_lt_compat; apply lt_INR_0; apply lt_O_Sn.
    apply (le_O_IZR (up (/ eps - 1)));
      apply (Rle_trans 0 (/ eps - 1) (IZR (up (/ eps - 1)))).
    generalize (Rnot_gt_le eps 1 Hnotgt); clear Hnotgt; unfold Rle; intro; elim H0;
      clear H0; intro.
    left; unfold Rgt in H;
      generalize (Rmult_lt_compat_l (/ eps) eps 1 (Rinv_0_lt_compat eps H) H0);
        rewrite
          (Rinv_l eps
            (not_eq_sym (Rlt_dichotomy_converse 0 eps (or_introl (0 > eps) H))))
          ; rewrite (let (H1, H2) := Rmult_ne (/ eps) in H1);
            intro; fold (/ eps - 1 > 0); apply Rgt_minus;
              unfold Rgt; assumption.
    right; rewrite H0; rewrite Rinv_1; symmetry; apply Rminus_diag_eq; auto.
    elim (archimed (/ eps - 1)); intros; clear H1; unfold Rgt in H0; apply Rlt_le;
      assumption.
Qed.