Fcore_generic_fmt.v 33.7 KB
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Require Import Fcore_Raux.
Require Import Fcore_defs.
Require Import Fcore_rnd.
Require Import Fcore_float_prop.
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Section RND_generic.

Variable beta : radix.

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Notation bpow e := (bpow beta e).
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Variable fexp : Z -> Z.

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Definition valid_exp :=
  forall k : Z,
  ( (fexp k < k)%Z -> (fexp (k + 1) <= k)%Z ) /\
  ( (k <= fexp k)%Z ->
    (fexp (fexp k + 1) <= fexp k)%Z /\
    forall l : Z, (l <= fexp k)%Z -> fexp l = fexp k ).

Variable prop_exp : valid_exp.
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Definition canonic_exponent x :=
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  fexp (ln_beta beta x).
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Definition canonic (f : float beta) :=
  Fexp f = canonic_exponent (F2R f).
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Definition scaled_mantissa x :=
  (x * bpow (- canonic_exponent x))%R.

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Definition generic_format (x : R) :=
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  x = F2R (Float beta (Ztrunc (scaled_mantissa x)) (canonic_exponent x)).
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Theorem generic_format_0 :
  generic_format 0.
Proof.
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unfold generic_format, scaled_mantissa.
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rewrite Rmult_0_l.
change (Ztrunc 0) with (Ztrunc (Z2R 0)).
now rewrite Ztrunc_Z2R, F2R_0.
Qed.

Theorem canonic_exponent_opp :
  forall x,
  canonic_exponent (-x) = canonic_exponent x.
Proof.
intros x.
unfold canonic_exponent.
now rewrite ln_beta_opp.
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Qed.

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Theorem canonic_exponent_abs :
  forall x,
  canonic_exponent (Rabs x) = canonic_exponent x.
Proof.
intros x.
unfold canonic_exponent.
now rewrite ln_beta_abs.
Qed.

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Theorem generic_format_bpow :
  forall e, (fexp (e + 1) <= e)%Z ->
  generic_format (bpow e).
Proof.
intros e H.
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unfold generic_format, scaled_mantissa, canonic_exponent.
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rewrite ln_beta_bpow.
rewrite <- bpow_add.
rewrite <- (Z2R_Zpower beta (e + - fexp (e + 1))).
rewrite Ztrunc_Z2R.
rewrite <- F2R_bpow.
rewrite F2R_change_exp with (1 := H).
now rewrite Zmult_1_l.
omega.
Qed.

Theorem generic_format_canonic_exponent :
  forall m e,
  (canonic_exponent (F2R (Float beta m e)) <= e)%Z ->
  generic_format (F2R (Float beta m e)).
Proof.
intros m e.
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unfold generic_format, scaled_mantissa.
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set (e' := canonic_exponent (F2R (Float beta m e))).
intros He.
unfold F2R at 3. simpl.
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assert (H: (Z2R m * bpow e * bpow (- e') = Z2R (m * Zpower beta (e + -e')))%R).
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rewrite Rmult_assoc, <- bpow_add, mult_Z2R.
rewrite Z2R_Zpower.
apply refl_equal.
now apply Zle_left.
rewrite H, Ztrunc_Z2R.
unfold F2R. simpl.
rewrite <- H.
rewrite Rmult_assoc, <- bpow_add, Zplus_opp_l.
now rewrite Rmult_1_r.
Qed.

Theorem canonic_opp :
  forall m e,
  canonic (Float beta m e) ->
  canonic (Float beta (-m) e).
Proof.
intros m e H.
unfold canonic.
now rewrite <- opp_F2R, canonic_exponent_opp.
Qed.

Theorem canonic_unicity :
  forall f1 f2,
  canonic f1 ->
  canonic f2 ->
  F2R f1 = F2R f2 ->
  f1 = f2.
Proof.
intros (m1, e1) (m2, e2).
unfold canonic. simpl.
intros H1 H2 H.
rewrite H in H1.
rewrite <- H2 in H1. clear H2.
rewrite H1 in H |- *.
apply (f_equal (fun m => Float beta m e2)).
apply F2R_eq_reg with (1 := H).
Qed.

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Theorem scaled_mantissa_generic :
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  forall x,
  generic_format x ->
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  scaled_mantissa x = Z2R (Ztrunc (scaled_mantissa x)).
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Proof.
intros x Hx.
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unfold scaled_mantissa.
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pattern x at 1 3 ; rewrite Hx.
unfold F2R. simpl.
rewrite Rmult_assoc, <- bpow_add, Zplus_opp_r, Rmult_1_r.
now rewrite Ztrunc_Z2R.
Qed.

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Theorem scaled_mantissa_bpow :
  forall x,
  (scaled_mantissa x * bpow (canonic_exponent x))%R = x.
Proof.
intros x.
unfold scaled_mantissa.
rewrite Rmult_assoc, <- bpow_add, Zplus_opp_l.
apply Rmult_1_r.
Qed.

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Theorem scaled_mantissa_0 :
  scaled_mantissa 0 = R0.
Proof.
apply Rmult_0_l.
Qed.

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Theorem scaled_mantissa_opp :
  forall x,
  scaled_mantissa (-x) = (-scaled_mantissa x)%R.
Proof.
intros x.
unfold scaled_mantissa.
rewrite canonic_exponent_opp.
now rewrite Ropp_mult_distr_l_reverse.
Qed.

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Theorem scaled_mantissa_abs :
  forall x,
  scaled_mantissa (Rabs x) = Rabs (scaled_mantissa x).
Proof.
intros x.
unfold scaled_mantissa.
rewrite canonic_exponent_abs, Rabs_mult.
apply f_equal.
apply sym_eq.
apply Rabs_pos_eq.
apply bpow_ge_0.
Qed.

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Theorem generic_format_opp :
  forall x, generic_format x -> generic_format (-x).
Proof.
intros x Hx.
unfold generic_format.
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rewrite scaled_mantissa_opp, canonic_exponent_opp.
rewrite Ztrunc_opp.
rewrite <- opp_F2R.
now apply f_equal.
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Qed.

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Theorem canonic_exponent_fexp :
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  forall x ex,
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  (bpow (ex - 1) <= Rabs x < bpow ex)%R ->
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  canonic_exponent x = fexp ex.
Proof.
intros x ex Hx.
unfold canonic_exponent.
now rewrite ln_beta_unique with (1 := Hx).
Qed.

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Theorem canonic_exponent_fexp_pos :
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  forall x ex,
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  (bpow (ex - 1) <= x < bpow ex)%R ->
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  canonic_exponent x = fexp ex.
Proof.
intros x ex Hx.
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apply canonic_exponent_fexp.
rewrite Rabs_pos_eq.
exact Hx.
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apply Rle_trans with (2 := proj1 Hx).
apply bpow_ge_0.
Qed.

Theorem mantissa_small_pos :
  forall x ex,
  (bpow (ex - 1) <= x < bpow ex)%R ->
  (ex <= fexp ex)%Z ->
  (0 < x * bpow (- fexp ex) < 1)%R.
Proof.
intros x ex Hx He.
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split.
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apply Rmult_lt_0_compat.
apply Rlt_le_trans with (2 := proj1 Hx).
apply bpow_gt_0.
apply bpow_gt_0.
apply Rmult_lt_reg_r with (bpow (fexp ex)).
apply bpow_gt_0.
rewrite Rmult_assoc, <- bpow_add, Zplus_opp_l.
rewrite Rmult_1_r, Rmult_1_l.
apply Rlt_le_trans with (1 := proj2 Hx).
now apply -> bpow_le.
Qed.

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Theorem scaled_mantissa_small :
  forall x ex,
  (Rabs x < bpow ex)%R ->
  (ex <= fexp ex)%Z ->
  (Rabs (scaled_mantissa x) < 1)%R.
Proof.
intros x ex Ex He.
destruct (Req_dec x 0) as [Zx|Zx].
rewrite Zx, scaled_mantissa_0, Rabs_R0.
now apply (Z2R_lt 0 1).
rewrite <- scaled_mantissa_abs.
unfold scaled_mantissa.
rewrite canonic_exponent_abs.
unfold canonic_exponent.
destruct (ln_beta beta x) as (ex', Ex').
simpl.
specialize (Ex' Zx).
apply (mantissa_small_pos _ _ Ex').
assert (ex' <= fexp ex)%Z.
apply Zle_trans with (2 := He).
apply bpow_lt_bpow with beta.
now apply Rle_lt_trans with (2 := Ex).
now rewrite (proj2 (proj2 (prop_exp _) He)).
Qed.

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Theorem mantissa_DN_small_pos :
  forall x ex,
  (bpow (ex - 1) <= x < bpow ex)%R ->
  (ex <= fexp ex)%Z ->
  Zfloor (x * bpow (- fexp ex)) = Z0.
Proof.
intros x ex Hx He.
apply Zfloor_imp. simpl.
assert (H := mantissa_small_pos x ex Hx He).
split ; try apply Rlt_le ; apply H.
Qed.

Theorem mantissa_UP_small_pos :
  forall x ex,
  (bpow (ex - 1) <= x < bpow ex)%R ->
  (ex <= fexp ex)%Z ->
  Zceil (x * bpow (- fexp ex)) = 1%Z.
Proof.
intros x ex Hx He.
apply Zceil_imp. simpl.
assert (H := mantissa_small_pos x ex Hx He).
split ; try apply Rlt_le ; apply H.
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Qed.

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Theorem generic_format_discrete :
  forall x m,
  let e := canonic_exponent x in
  (F2R (Float beta m e) < x < F2R (Float beta (m + 1) e))%R ->
  ~ generic_format x.
Proof.
intros x m e (Hx,Hx2) Hf.
apply Rlt_not_le with (1 := Hx2). clear Hx2.
rewrite Hf.
fold e.
apply F2R_le_compat.
apply Zlt_le_succ.
apply lt_Z2R.
rewrite <- scaled_mantissa_generic with (1 := Hf).
apply Rmult_lt_reg_r with (bpow e).
apply bpow_gt_0.
now rewrite scaled_mantissa_bpow.
Qed.

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Theorem generic_format_canonic :
  forall f, canonic f ->
  generic_format (F2R f).
Proof.
intros (m, e) Hf.
unfold canonic in Hf. simpl in Hf.
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unfold generic_format, scaled_mantissa.
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rewrite <- Hf.
apply (f_equal (fun m => F2R (Float beta m e))).
unfold F2R. simpl.
rewrite Rmult_assoc, <- bpow_add, Zplus_opp_r, Rmult_1_r.
now rewrite Ztrunc_Z2R.
Qed.

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Theorem canonic_exp_ge:
  forall prec,
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  (forall e, (e - fexp e <= prec)%Z) ->
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  (* OK with FLX, FLT and FTZ *)
  forall x, generic_format x ->
  (Rabs x < bpow (prec + canonic_exponent x))%R.
intros prec Hp x Hx.
case (Req_dec x 0); intros Hxz.
rewrite Hxz, Rabs_R0.
apply bpow_gt_0.
unfold canonic_exponent.
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destruct (ln_beta beta x) as (ex,Ex) ; simpl.
specialize (Ex Hxz).
apply Rlt_le_trans with (1 := proj2 Ex).
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apply -> bpow_le.
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specialize (Hp ex).
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omega.
Qed.

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Theorem generic_format_bpow_inv :
  forall e,
    generic_format (bpow e) ->
   (fexp e <= e)%Z.
Proof.
intros e He.
apply Znot_gt_le; intros He2.
unfold valid_exp in prop_exp.
assert (e+1 <= fexp (e+1))%Z.
replace (fexp (e+1)) with (fexp e).
omega.
destruct (prop_exp e) as (Y1,Y2).
apply sym_eq; apply Y2; omega.
absurd (bpow e=0)%R.
apply sym_not_eq; apply Rlt_not_eq.
apply bpow_gt_0.
rewrite He.
replace (Ztrunc (scaled_mantissa (bpow e))) with 0%Z.
apply F2R_0.
apply sym_eq.
rewrite Ztrunc_floor.
unfold scaled_mantissa, canonic_exponent.
apply mantissa_DN_small_pos; trivial.
rewrite ln_beta_bpow.
split.
apply Req_le.
apply f_equal.
ring.
apply -> bpow_lt.
omega.
now rewrite ln_beta_bpow.
unfold scaled_mantissa.
apply Rmult_le_pos; apply bpow_ge_0.
Qed.

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Section Fcore_generic_rounding_pos.
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Record Zrounding := mkZrounding {
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  Zrnd : R -> Z ;
  Zrnd_monotone : forall x y, (x <= y)%R -> (Zrnd x <= Zrnd y)%Z ;
  Zrnd_Z2R : forall n, Zrnd (Z2R n) = n
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}.

Variable rnd : Zrounding.
Let Zrnd := Zrnd rnd.
Let Zrnd_monotone := Zrnd_monotone rnd.
Let Zrnd_Z2R := Zrnd_Z2R rnd.
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Theorem Zrnd_DN_or_UP :
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  forall x, Zrnd x = Zfloor x \/ Zrnd x = Zceil x.
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Proof.
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intros x.
destruct (Zle_or_lt (Zrnd x) (Zfloor x)) as [Hx|Hx].
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left.
apply Zle_antisym with (1 := Hx).
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rewrite <- (Zrnd_Z2R (Zfloor x)).
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apply Zrnd_monotone.
apply Zfloor_lb.
right.
apply Zle_antisym.
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rewrite <- (Zrnd_Z2R (Zceil x)).
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apply Zrnd_monotone.
apply Zceil_ub.
rewrite Zceil_floor_neq.
omega.
intros H.
rewrite <- H in Hx.
rewrite Zfloor_Z2R, Zrnd_Z2R in Hx.
apply Zlt_irrefl with (1 := Hx).
Qed.

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Definition rounding x :=
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  F2R (Float beta (Zrnd (scaled_mantissa x)) (canonic_exponent x)).
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Theorem rounding_monotone_pos :
  forall x y, (0 < x)%R -> (x <= y)%R -> (rounding x <= rounding y)%R.
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Proof.
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intros x y Hx Hxy.
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unfold rounding, scaled_mantissa, canonic_exponent.
destruct (ln_beta beta x) as (ex, Hex). simpl.
destruct (ln_beta beta y) as (ey, Hey). simpl.
specialize (Hex (Rgt_not_eq _ _ Hx)).
specialize (Hey (Rgt_not_eq _ _ (Rlt_le_trans _ _ _ Hx Hxy))).
rewrite Rabs_pos_eq in Hex.
2: now apply Rlt_le.
rewrite Rabs_pos_eq in Hey.
2: apply Rle_trans with (2:=Hxy); now apply Rlt_le.
assert (He: (ex <= ey)%Z).
cut (ex - 1 < ey)%Z. omega.
apply <- bpow_lt.
apply Rle_lt_trans with (1 := proj1 Hex).
apply Rle_lt_trans with (1 := Hxy).
apply Hey.
destruct (Zle_or_lt ey (fexp ey)) as [Hy1|Hy1].
rewrite (proj2 (proj2 (prop_exp ey) Hy1) ex).
apply F2R_le_compat.
apply Zrnd_monotone.
apply Rmult_le_compat_r.
apply bpow_ge_0.
exact Hxy.
now apply Zle_trans with ey.
destruct (Zle_lt_or_eq _ _ He) as [He'|He'].
destruct (Zle_or_lt ey (fexp ex)) as [Hx2|Hx2].
rewrite (proj2 (proj2 (prop_exp ex) (Zle_trans _ _ _ He Hx2)) ey Hx2).
apply F2R_le_compat.
apply Zrnd_monotone.
apply Rmult_le_compat_r.
apply bpow_ge_0.
exact Hxy.
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apply Rle_trans with (F2R (Float beta (Zrnd (bpow (ey - 1) * bpow (- fexp ey))) (fexp ey))).
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rewrite <- bpow_add.
rewrite <- (Z2R_Zpower beta (ey - 1 + -fexp ey)). 2: omega.
rewrite Zrnd_Z2R.
destruct (Zle_or_lt ex (fexp ex)) as [Hx1|Hx1].
apply Rle_trans with (F2R (Float beta 1 (fexp ex))).
apply F2R_le_compat.
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rewrite <- (Zrnd_Z2R 1).
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apply Zrnd_monotone.
apply Rlt_le.
exact (proj2 (mantissa_small_pos _ _ Hex Hx1)).
unfold F2R. simpl.
rewrite Z2R_Zpower. 2: omega.
rewrite <- bpow_add, Rmult_1_l.
apply -> bpow_le.
omega.
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apply Rle_trans with (F2R (Float beta (Zrnd (bpow ex * bpow (- fexp ex))) (fexp ex))).
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apply F2R_le_compat.
apply Zrnd_monotone.
apply Rmult_le_compat_r.
apply bpow_ge_0.
apply Rlt_le.
apply Hex.
rewrite <- bpow_add.
rewrite <- Z2R_Zpower. 2: omega.
rewrite Zrnd_Z2R.
unfold F2R. simpl.
rewrite 2!Z2R_Zpower ; try omega.
rewrite <- 2!bpow_add.
apply -> bpow_le.
omega.
apply F2R_le_compat.
apply Zrnd_monotone.
apply Rmult_le_compat_r.
apply bpow_ge_0.
apply Hey.
rewrite He'.
apply F2R_le_compat.
apply Zrnd_monotone.
apply Rmult_le_compat_r.
apply bpow_ge_0.
exact Hxy.
Qed.

Theorem rounding_generic :
  forall x,
  generic_format x ->
  rounding x = x.
Proof.
intros x Hx.
unfold rounding.
rewrite scaled_mantissa_generic with (1 := Hx).
rewrite Zrnd_Z2R.
now apply sym_eq.
Qed.

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Theorem rounding_0 :
  rounding 0 = R0.
Proof.
unfold rounding, scaled_mantissa.
rewrite Rmult_0_l.
fold (Z2R 0).
rewrite Zrnd_Z2R.
apply F2R_0.
Qed.

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Theorem rounding_bounded_large_pos :
  forall x ex,
  (fexp ex < ex)%Z ->
  (bpow (ex - 1) <= x < bpow ex)%R ->
  (bpow (ex - 1) <= rounding x <= bpow ex)%R.
Proof.
intros x ex He Hx.
unfold rounding, scaled_mantissa.
rewrite (canonic_exponent_fexp_pos _ _ Hx).
unfold F2R. simpl.
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destruct (Zrnd_DN_or_UP (x * bpow (- fexp ex))) as [Hr|Hr] ; rewrite Hr.
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(* DN *)
split.
replace (ex - 1)%Z with (ex - 1 + - fexp ex + fexp ex)%Z by ring.
rewrite bpow_add.
apply Rmult_le_compat_r.
apply bpow_ge_0.
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assert (Hf: Z2R (Zpower beta (ex - 1 - fexp ex)) = bpow (ex - 1 + - fexp ex)).
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apply Z2R_Zpower.
omega.
rewrite <- Hf.
apply Z2R_le.
apply Zfloor_lub.
rewrite Hf.
rewrite bpow_add.
apply Rmult_le_compat_r.
apply bpow_ge_0.
apply Hx.
apply Rle_trans with (2 := Rlt_le _ _ (proj2 Hx)).
apply Rmult_le_reg_r with (bpow (- fexp ex)).
apply bpow_gt_0.
rewrite Rmult_assoc, <- bpow_add, Zplus_opp_r, Rmult_1_r.
apply Zfloor_lb.
(* UP *)
split.
apply Rle_trans with (1 := proj1 Hx).
apply Rmult_le_reg_r with (bpow (- fexp ex)).
apply bpow_gt_0.
rewrite Rmult_assoc, <- bpow_add, Zplus_opp_r, Rmult_1_r.
apply Zceil_ub.
pattern ex at 3 ; replace ex with (ex - fexp ex + fexp ex)%Z by ring.
rewrite bpow_add.
apply Rmult_le_compat_r.
apply bpow_ge_0.
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assert (Hf: Z2R (Zpower beta (ex - fexp ex)) = bpow (ex - fexp ex)).
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apply Z2R_Zpower.
omega.
rewrite <- Hf.
apply Z2R_le.
apply Zceil_glb.
rewrite Hf.
unfold Zminus.
rewrite bpow_add.
apply Rmult_le_compat_r.
apply bpow_ge_0.
apply Rlt_le.
apply Hx.
Qed.

Theorem rounding_bounded_small_pos :
  forall x ex,
  (ex <= fexp ex)%Z ->
  (bpow (ex - 1) <= x < bpow ex)%R ->
  rounding x = R0 \/ rounding x = bpow (fexp ex).
Proof.
intros x ex He Hx.
unfold rounding, scaled_mantissa.
rewrite (canonic_exponent_fexp_pos _ _ Hx).
unfold F2R. simpl.
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destruct (Zrnd_DN_or_UP (x * bpow (-fexp ex))) as [Hr|Hr] ; rewrite Hr.
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(* DN *)
left.
apply Rmult_eq_0_compat_r.
apply (@f_equal _ _ Z2R _ Z0).
apply Zfloor_imp.
refine (let H := _ in conj (Rlt_le _ _ (proj1 H)) (proj2 H)).
now apply mantissa_small_pos.
(* UP *)
right.
pattern (bpow (fexp ex)) at 2 ; rewrite <- Rmult_1_l.
apply (f_equal (fun m => (m * bpow (fexp ex))%R)).
apply (@f_equal _ _ Z2R _ 1%Z).
apply Zceil_imp.
refine (let H := _ in conj (proj1 H) (Rlt_le _ _ (proj2 H))).
now apply mantissa_small_pos.
Qed.

Theorem generic_format_rounding_pos :
  forall x,
  (0 < x)%R ->
  generic_format (rounding x).
Proof.
intros x Hx0.
destruct (ln_beta beta x) as (ex, Hex).
specialize (Hex (Rgt_not_eq _ _ Hx0)).
rewrite Rabs_pos_eq in Hex. 2: now apply Rlt_le.
destruct (Zle_or_lt ex (fexp ex)) as [He|He].
(* small *)
destruct (rounding_bounded_small_pos _ _ He Hex) as [Hr|Hr] ; rewrite Hr.
apply generic_format_0.
apply generic_format_bpow.
now apply (proj2 (prop_exp ex)).
(* large *)
generalize (rounding_bounded_large_pos _ _ He Hex).
intros (Hr1, Hr2).
destruct (Rle_or_lt (bpow ex) (rounding x)) as [Hr|Hr].
rewrite <- (Rle_antisym _ _ Hr Hr2).
apply generic_format_bpow.
now apply (proj1 (prop_exp ex)).
assert (Hr' := conj Hr1 Hr).
unfold generic_format, scaled_mantissa.
rewrite (canonic_exponent_fexp_pos _ _ Hr').
unfold rounding, scaled_mantissa.
rewrite (canonic_exponent_fexp_pos _ _ Hex).
unfold F2R at 3. simpl.
rewrite Rmult_assoc, <- bpow_add, Zplus_opp_r, Rmult_1_r.
now rewrite Ztrunc_Z2R.
Qed.

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End Fcore_generic_rounding_pos.

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Theorem rounding_ext :
  forall rnd1 rnd2,
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  ( forall x, Zrnd rnd1 x = Zrnd rnd2 x ) ->
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  forall x,
  rounding rnd1 x = rounding rnd2 x.
Proof.
intros rnd1 rnd2 Hext x.
unfold rounding.
now rewrite Hext.
Qed.

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Section Zrounding_opp.

Variable rnd : Zrounding.

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Definition Zrnd_opp x := Zopp (Zrnd rnd (-x)).
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Lemma Zrnd_opp_le :
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  forall x y, (x <= y)%R -> (Zrnd_opp x <= Zrnd_opp y)%Z.
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Proof.
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intros x y Hxy.
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unfold Zrnd_opp.
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apply Zopp_le_cancel.
rewrite 2!Zopp_involutive.
apply Zrnd_monotone.
now apply Ropp_le_contravar.
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Qed.

Lemma Zrnd_opp_Z2R :
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  forall n, Zrnd_opp (Z2R n) = n.
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Proof.
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intros n.
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unfold Zrnd_opp.
rewrite <- opp_Z2R, Zrnd_Z2R.
apply Zopp_involutive.
Qed.

Definition Zrounding_opp := mkZrounding Zrnd_opp Zrnd_opp_le Zrnd_opp_Z2R.

Theorem rounding_opp :
  forall x,
  rounding rnd (- x) = Ropp (rounding Zrounding_opp x).
Proof.
intros x.
unfold rounding.
rewrite opp_F2R, canonic_exponent_opp, scaled_mantissa_opp.
apply (f_equal (fun m => F2R (Float beta m _))).
apply sym_eq.
exact (Zopp_involutive _).
Qed.

End Zrounding_opp.

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Definition ZrndDN := mkZrounding Zfloor Zfloor_le Zfloor_Z2R.
Definition ZrndUP := mkZrounding Zceil Zceil_le Zceil_Z2R.
Definition ZrndTZ := mkZrounding Ztrunc Ztrunc_le Ztrunc_Z2R.
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Theorem rounding_DN_or_UP :
  forall rnd x,
  rounding rnd x = rounding ZrndDN x \/ rounding rnd x = rounding ZrndUP x.
Proof.
intros rnd x.
unfold rounding.
unfold Zrnd at 2 4. simpl.
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destruct (Zrnd_DN_or_UP rnd (scaled_mantissa x)) as [Hx|Hx].
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left. now rewrite Hx.
right. now rewrite Hx.
Qed.

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Theorem rounding_monotone :
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  forall rnd x y, (x <= y)%R -> (rounding rnd x <= rounding rnd y)%R.
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Proof.
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intros rnd x y Hxy.
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destruct (total_order_T x 0) as [[Hx|Hx]|Hx].
3: now apply rounding_monotone_pos.
(* x < 0 *)
unfold rounding.
destruct (Rlt_or_le y 0) as [Hy|Hy].
(* . y < 0 *)
rewrite <- (Ropp_involutive x), <- (Ropp_involutive y).
rewrite (scaled_mantissa_opp (-x)), (scaled_mantissa_opp (-y)).
rewrite (canonic_exponent_opp (-x)), (canonic_exponent_opp (-y)).
apply Ropp_le_cancel.
rewrite 2!opp_F2R.
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apply (rounding_monotone_pos (Zrounding_opp rnd) (-y) (-x)).
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rewrite <- Ropp_0.
now apply Ropp_lt_contravar.
now apply Ropp_le_contravar.
(* . 0 <= y *)
apply Rle_trans with R0.
apply F2R_le_0_compat. simpl.
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rewrite <- (Zrnd_Z2R rnd 0).
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apply Zrnd_monotone.
simpl.
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rewrite <- (Rmult_0_l (bpow (- fexp (ln_beta beta x)))).
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apply Rmult_le_compat_r.
apply bpow_ge_0.
now apply Rlt_le.
apply F2R_ge_0_compat. simpl.
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rewrite <- (Zrnd_Z2R rnd 0).
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apply Zrnd_monotone.
apply Rmult_le_pos.
exact Hy.
apply bpow_ge_0.
(* x = 0 *)
rewrite Hx.
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rewrite rounding_0.
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apply F2R_ge_0_compat.
simpl.
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rewrite <- (Zrnd_Z2R rnd 0).
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apply Zrnd_monotone.
apply Rmult_le_pos.
now rewrite <- Hx.
apply bpow_ge_0.
Qed.

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Theorem rounding_monotone_l :
  forall rnd x y, generic_format x -> (x <= y)%R -> (x <= rounding rnd y)%R.
Proof.
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intros rnd x y Hx Hxy.
rewrite <- (rounding_generic rnd x Hx).
now apply rounding_monotone.
Qed.
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Theorem rounding_monotone_r :
  forall rnd x y, generic_format y -> (x <= y)%R -> (rounding rnd x <= y)%R.
Proof.
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intros rnd x y Hy Hxy.
rewrite <- (rounding_generic rnd y Hy).
now apply rounding_monotone.
Qed.
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Theorem rounding_abs_abs :
  forall P : R -> R -> Prop,
  ( forall rnd x, P x (rounding rnd x) ) ->
  forall rnd x, P (Rabs x) (Rabs (rounding rnd x)).
Proof.
intros P HP rnd x.
destruct (Rle_or_lt 0 x) as [Hx|Hx].
(* . *)
rewrite 2!Rabs_pos_eq.
apply HP.
rewrite <- (rounding_0 rnd).
now apply rounding_monotone.
exact Hx.
(* . *)
rewrite (Rabs_left _ Hx).
rewrite Rabs_left1.
pattern x at 2 ; rewrite <- Ropp_involutive.
rewrite rounding_opp.
rewrite Ropp_involutive.
apply HP.
rewrite <- (rounding_0 rnd).
apply rounding_monotone.
now apply Rlt_le.
Qed.

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Theorem rounding_monotone_abs_l :
  forall rnd x y, generic_format x -> (x <= Rabs y)%R -> (x <= Rabs (rounding rnd y))%R.
Proof.
intros rnd x y.
apply rounding_abs_abs.
clear rnd y; intros rnd y Hy.
now apply rounding_monotone_l.
Qed.

Theorem rounding_monotone_abs_r :
  forall rnd x y, generic_format y -> (Rabs x <= y)%R -> (Rabs (rounding rnd x) <= y)%R.
Proof.
intros rnd x y.
apply rounding_abs_abs.
clear rnd x; intros rnd x Hx.
now apply rounding_monotone_r.
Qed.

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Theorem rounding_DN_opp :
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  forall x,
  rounding ZrndDN (-x) = (- rounding ZrndUP x)%R.
Proof.
intros x.
unfold rounding.
rewrite scaled_mantissa_opp.
rewrite opp_F2R.
unfold Zrnd. simpl.
unfold Zceil.
rewrite Zopp_involutive.
now rewrite canonic_exponent_opp.
Qed.

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Theorem rounding_UP_opp :
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  forall x,
  rounding ZrndUP (-x) = (- rounding ZrndDN x)%R.
Proof.
intros x.
unfold rounding.
rewrite scaled_mantissa_opp.
rewrite opp_F2R.
unfold Zrnd. simpl.
unfold Zceil.
rewrite Ropp_involutive.
now rewrite canonic_exponent_opp.
Qed.

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Theorem generic_format_rounding :
  forall Zrnd x,
  generic_format (rounding Zrnd x).
Proof.
intros rnd x.
destruct (total_order_T x 0) as [[Hx|Hx]|Hx].
rewrite <- (Ropp_involutive x).
destruct (rounding_DN_or_UP rnd (- - x)) as [Hr|Hr] ; rewrite Hr.
rewrite rounding_DN_opp.
apply generic_format_opp.
apply generic_format_rounding_pos.
now apply Ropp_0_gt_lt_contravar.
rewrite rounding_UP_opp.
apply generic_format_opp.
apply generic_format_rounding_pos.
now apply Ropp_0_gt_lt_contravar.
rewrite Hx.
rewrite rounding_0.
apply generic_format_0.
now apply generic_format_rounding_pos.
Qed.

Theorem generic_DN_pt :
  forall x,
  Rnd_DN_pt generic_format x (rounding ZrndDN x).
Proof.
intros x.
split.
apply generic_format_rounding.
split.
pattern x at 2 ; rewrite <- scaled_mantissa_bpow.
unfold rounding, F2R. simpl.
apply Rmult_le_compat_r.
apply bpow_ge_0.
apply Zfloor_lb.
intros g Hg Hgx.
rewrite <- (rounding_generic ZrndDN _ Hg).
now apply rounding_monotone.
Qed.

Theorem generic_format_satisfies_any :
  satisfies_any generic_format.
Proof.
split.
(* symmetric set *)
exact generic_format_0.
exact generic_format_opp.
(* rounding down *)
intros x.
exists (rounding ZrndDN x).
apply generic_DN_pt.
Qed.

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Theorem generic_UP_pt :
  forall x,
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  Rnd_UP_pt generic_format x (rounding ZrndUP x).
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Proof.
intros x.
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rewrite <- (Ropp_involutive x).
rewrite rounding_UP_opp.
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apply Rnd_DN_UP_pt_sym.
apply generic_format_satisfies_any.
apply generic_DN_pt.
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Qed.

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Theorem rounding_DN_small_pos :
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  forall x ex,
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  (bpow (ex - 1) <= x < bpow ex)%R ->
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  (ex <= fexp ex)%Z ->
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  rounding ZrndDN x = R0.
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Proof.
intros x ex Hx He.
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rewrite <- (F2R_0 beta (canonic_exponent x)).
rewrite <- mantissa_DN_small_pos with (1 := Hx) (2 := He).
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now rewrite <- canonic_exponent_fexp_pos with (1 := Hx).
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Qed.

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Theorem rounding_UP_small_pos :
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  forall x ex,
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  (bpow (ex - 1) <= x < bpow ex)%R ->
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  (ex <= fexp ex)%Z ->
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  rounding ZrndUP x = (bpow (fexp ex)).
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Proof.
intros x ex Hx He.
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rewrite <- F2R_bpow.
rewrite <- mantissa_UP_small_pos with (1 := Hx) (2 := He).
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now rewrite <- canonic_exponent_fexp_pos with (1 := Hx).
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Qed.

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Theorem generic_format_EM :
  forall x,
  generic_format x \/ ~generic_format x.
Proof.
intros x.
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destruct (Req_dec (rounding ZrndDN x) x) as [Hx|Hx].
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left.
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rewrite <- Hx.
apply generic_format_rounding.
right.
intros H.
apply Hx.
now apply rounding_generic.
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Qed.

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Theorem rounding_large_pos_ge_pow :
  forall rnd x e,
  (0 < rounding rnd x)%R ->
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  (bpow e <= x)%R ->
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  (bpow e <= rounding rnd x)%R.
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Proof.
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intros rnd x e Hd Hex.
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destruct (ln_beta beta x) as (ex, He).
assert (Hx: (0 < x)%R).
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apply Rlt_le_trans with (2 := Hex).
apply bpow_gt_0.
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specialize (He (Rgt_not_eq _ _ Hx)).
rewrite Rabs_pos_eq in He. 2: now apply Rlt_le.
apply Rle_trans with (bpow (ex - 1)).
apply -> bpow_le.
cut (e < ex)%Z. omega.
apply <- bpow_lt.
now apply Rle_lt_trans with (2 := proj2 He).
destruct (Zle_or_lt ex (fexp ex)).
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destruct (rounding_bounded_small_pos rnd x ex H He) as [Hr|Hr].
rewrite Hr in Hd.
elim Rlt_irrefl with (1 := Hd).
rewrite Hr.
apply -> bpow_le.
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omega.
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apply (rounding_bounded_large_pos rnd x ex H He).
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Qed.

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Theorem canonic_exponent_DN :
  forall x,
  (0 < rounding ZrndDN x)%R ->
  canonic_exponent (rounding ZrndDN x) = canonic_exponent x.
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Proof.
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intros x Hd.
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unfold canonic_exponent.
apply f_equal.
apply ln_beta_unique.
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rewrite (Rabs_pos_eq (rounding ZrndDN x)). 2: now apply Rlt_le.
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destruct (ln_beta beta x) as (ex, He).
simpl.
assert (Hx: (0 < x)%R).
apply Rlt_le_trans with (1 := Hd).
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apply (generic_DN_pt x).
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specialize (He (Rgt_not_eq _ _ Hx)).
rewrite Rabs_pos_eq in He. 2: now apply Rlt_le.
split.
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apply rounding_large_pos_ge_pow with (1 := Hd).
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apply He.
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apply Rle_lt_trans with (2 := proj2 He).
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apply (generic_DN_pt x).
Qed.

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Theorem scaled_mantissa_DN :
  forall x,
  (0 < rounding ZrndDN x)%R ->
  scaled_mantissa (rounding ZrndDN x) = Z2R (Zfloor (scaled_mantissa x)).
Proof.
intros x Hd.
unfold scaled_mantissa.
rewrite canonic_exponent_DN with (1 := Hd).
unfold rounding, F2R. simpl.
now rewrite Rmult_assoc, <- bpow_add, Zplus_opp_r, Rmult_1_r.
Qed.

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Theorem generic_N_pt_DN_or_UP :
  forall x f,
  Rnd_N_pt generic_format x f ->
  f = rounding ZrndDN x \/ f = rounding ZrndUP x.
Proof.
intros x f Hxf.
destruct (Rnd_N_pt_DN_or_UP _ _ _ Hxf).
left.
apply Rnd_DN_pt_unicity with (1 := H).
apply generic_DN_pt.
right.
apply Rnd_UP_pt_unicity with (1 := H).
apply generic_UP_pt.
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Qed.

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Section not_FTZ.

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Definition not_FTZ_prop := forall e, (fexp (fexp e + 1) <= fexp e)%Z.
Hypothesis not_FTZ : not_FTZ_prop.
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Theorem subnormal_exponent :
  forall e x,
  (e <= fexp e)%Z ->
  generic_format x ->
  x = F2R (Float beta (Ztrunc (x * bpow (- fexp e))) (fexp e)).
Proof.
intros e x He Hx.
pattern x at 2 ; rewrite Hx.
unfold F2R at 2. simpl.
rewrite Rmult_assoc, <- bpow_add.
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assert (H: Z2R (Zpower beta (canonic_exponent x + - fexp e)) = bpow (canonic_exponent x + - fexp e)).
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apply Z2R_Zpower.
unfold canonic_exponent.
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set (ex := ln_beta beta x).
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generalize (not_FTZ ex).
generalize (proj2 (proj2 (prop_exp _) He) (fexp ex + 1)%Z).
omega.
rewrite <- H.
rewrite <- mult_Z2R, Ztrunc_Z2R.
unfold F2R. simpl.
rewrite mult_Z2R.
rewrite H.
rewrite Rmult_assoc, <- bpow_add.
now ring_simplify (canonic_exponent x + - fexp e + fexp e)%Z.
Qed.

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End not_FTZ.

Section Znearest.

Variable choice : R -> bool.

Definition Znearest x :=
  match Rcompare (x - Z2R (Zfloor x)) (/2) with
  | Lt => Zfloor x
  | Eq => if choice x then Zceil x else Zfloor x
  | Gt => Zceil x
  end.

Theorem Znearest_Z2R :
  forall n, Znearest (Z2R n) = n.
Proof.
intros n.
unfold Znearest.
rewrite Zfloor_Z2R.
rewrite Rcompare_Lt.
easy.
unfold Rminus.
rewrite Rplus_opp_r.
apply Rinv_0_lt_compat.
now apply (Z2R_lt 0 2).
Qed.

Theorem Znearest_DN_or_UP :
  forall x,
  Znearest x = Zfloor x \/ Znearest x = Zceil x.
Proof.
intros x.
unfold Znearest.
case Rcompare_spec ; intros _.
now left.
case (choice x).
now right.
now left.
now right.
Qed.

Theorem Znearest_ge_floor :
  forall x,
  (Zfloor x <= Znearest x)%Z.
Proof.
intros x.
destruct (Znearest_DN_or_UP x) as [Hx|Hx] ; rewrite Hx.
apply Zle_refl.
apply le_Z2R.
apply Rle_trans with x.
apply Zfloor_lb.
apply Zceil_ub.
Qed.

Theorem Znearest_le_ceil :
  forall x,
  (Znearest x <= Zceil x)%Z.
Proof.
intros x.
destruct (Znearest_DN_or_UP x) as [Hx|Hx] ; rewrite Hx.
apply le_Z2R.
apply Rle_trans with x.
apply Zfloor_lb.
apply Zceil_ub.
apply Zle_refl.
Qed.

Theorem Znearest_monotone :
  forall x y, (x <= y)%R ->
  (Znearest x <= Znearest y)%Z.
Proof.
intros x y Hxy.
destruct (Rle_or_lt (Z2R (Zceil x)) y) as [H|H].
apply Zle_trans with (1 := Znearest_le_ceil x).
apply Zle_trans with (2 := Znearest_ge_floor y).
now apply Zfloor_lub.
(* . *)
assert (Hf: Zfloor y = Zfloor x).
apply Zfloor_imp.
split.
apply Rle_trans with (2 := Zfloor_lb y).
apply Z2R_le.
now apply Zfloor_le.
apply Rlt_le_trans with (1 := H).
apply Z2R_le.
apply Zceil_glb.
apply Rlt_le.
rewrite plus_Z2R.
apply Zfloor_ub.
(* . *)
unfold Znearest at 1.
case Rcompare_spec ; intro Hx.
(* .. *)
rewrite <- Hf.
apply Znearest_ge_floor.
(* .. *)
unfold Znearest.
rewrite Hf.
case Rcompare_spec ; intro Hy.
elim Rlt_not_le with (1 := Hy).
rewrite <- Hx.
now apply Rplus_le_compat_r.
replace y with x.
apply Zle_refl.
apply Rplus_eq_reg_l with (- Z2R (Zfloor x))%R.
rewrite 2!(Rplus_comm (- (Z2R (Zfloor x)))).
change (x - Z2R (Zfloor x) = y - Z2R (Zfloor x))%R.
now rewrite Hy.
apply Zle_trans with (Zceil x).
case (choice x).
apply Zle_refl.
apply le_Z2R.
apply Rle_trans with x.
apply Zfloor_lb.
apply Zceil_ub.
now apply Zceil_le.
(* .. *)
unfold Znearest.
rewrite Hf.
rewrite Rcompare_Gt.
now apply Zceil_le.
apply Rlt_le_trans with (1 := Hx).
now apply Rplus_le_compat_r.
Qed.

Theorem Rcompare_floor_ceil_mid :
  forall x,
  Z2R (Zfloor x) <> x ->
  Rcompare (x - Z2R (Zfloor x)) (/ 2) = Rcompare (x - Z2R (Zfloor x)) (Z2R (Zceil x) - x).
Proof.
intros x Hx.
rewrite Zceil_floor_neq with (1 := Hx).
rewrite plus_Z2R. simpl.
destruct (Rcompare_spec (x - Z2R (Zfloor x)) (/ 2)) as [H1|H1|H1] ; apply sym_eq.
(* . *)
apply Rcompare_Lt.
apply Rplus_lt_reg_r with (x - Z2R (Zfloor x))%R.
replace (x - Z2R (Zfloor x) + (x - Z2R (Zfloor x)))%R with ((x - Z2R (Zfloor x)) * 2)%R by ring.
replace (x - Z2R (Zfloor x) + (Z2R (Zfloor x) + 1 - x))%R with (/2 * 2)%R by field.
apply Rmult_lt_compat_r with (2 := H1).
now apply (Z2R_lt 0 2).
(* . *)
apply Rcompare_Eq.
replace (Z2R (Zfloor x) + 1 - x)%R with (1 - (x - Z2R (Zfloor x)))%R by ring.
rewrite H1.
field.
(* . *)
apply Rcompare_Gt.
apply Rplus_lt_reg_r with (x - Z2R (Zfloor x))%R.
replace (x - Z2R (Zfloor x) + (x - Z2R (Zfloor x)))%R with ((x - Z2R (Zfloor x)) * 2)%R by ring.
replace (x - Z2R (Zfloor x) + (Z2R (Zfloor x) + 1 - x))%R with (/2 * 2)%R by field.
apply Rmult_lt_compat_r with (2 := H1).
now apply (Z2R_lt 0 2).
Qed.

Theorem Rcompare_ceil_floor_mid :
  forall x,
  Z2R (Zfloor x) <> x ->
  Rcompare (Z2R (Zceil x) - x) (/ 2) = Rcompare (Z2R (Zceil x) - x) (x - Z2R (Zfloor x)).
Proof.
intros x Hx.
rewrite Zceil_floor_neq with (1 := Hx).
rewrite plus_Z2R. simpl.
destruct (Rcompare_spec (Z2R (Zfloor x) + 1 - x) (/ 2)) as [H1|H1|H1] ; apply sym_eq.
(* . *)
apply Rcompare_Lt.
apply Rplus_lt_reg_r with (Z2R (Zfloor x) + 1 - x)%R.
replace (Z2R (Zfloor x) + 1 - x + (Z2R (Zfloor x) + 1 - x))%R with ((Z2R (Zfloor x) + 1 - x) * 2)%R by ring.
replace (Z2R (Zfloor x) + 1 - x + (x - Z2R (Zfloor x)))%R with (/2 * 2)%R by field.
apply Rmult_lt_compat_r with (2 := H1).
now apply (Z2R_lt 0 2).
(* . *)
apply Rcompare_Eq.
replace (x - Z2R (Zfloor x))%R with (1 - (Z2R (Zfloor x) + 1 - x))%R by ring.
rewrite H1.
field.
(* . *)
apply Rcompare_Gt.
apply Rplus_lt_reg_r with (Z2R (Zfloor x) + 1 - x)%R.
replace (Z2R (Zfloor x) + 1 - x + (Z2R (Zfloor x) + 1 - x))%R with ((Z2R (Zfloor x) + 1 - x) * 2)%R by ring.
replace (Z2R (Zfloor x) + 1 - x + (x - Z2R (Zfloor x)))%R with (/2 * 2)%R by field.
apply Rmult_lt_compat_r with (2 := H1).
now apply (Z2R_lt 0 2).
Qed.

1232
Definition ZrndN := mkZrounding Znearest Znearest_monotone Znearest_Z2R.
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Theorem Znearest_N_strict :
  forall x,
  (x - Z2R (Zfloor x) <> /2)%R ->
  (Rabs (x - Z2R (Znearest x)) < /2)%R.
Proof.
intros x Hx.
unfold Znearest.
case Rcompare_spec ; intros H.
rewrite Rabs_pos_eq.
exact H.
apply Rle_0_minus.
apply Zfloor_lb.
now elim Hx.
rewrite Rabs_left1.
rewrite Ropp_minus_distr.
rewrite Zceil_floor_neq.
rewrite plus_Z2R.
simpl.
apply Ropp_lt_cancel.
apply Rplus_lt_reg_r with R1.
replace (1 + -/2)%R with (/2)%R by field.
now replace (1 + - (Z2R (Zfloor x) + 1 - x))%R with (x - Z2R (Zfloor x))%R by ring.
apply Rlt_not_eq.
apply Rplus_lt_reg_r with (- Z2R (Zfloor x))%R.
apply Rlt_trans with (/2)%R.
rewrite Rplus_opp_l.
apply Rinv_0_lt_compat.
now apply (Z2R_lt 0 2).
now rewrite <- (Rplus_comm x).
apply Rle_minus.
apply Zceil_ub.
Qed.

Theorem Znearest_N :
  forall x,
  (Rabs (x - Z2R (Znearest x)) <= /2)%R.
Proof.
intros x.
destruct (Req_dec (x - Z2R (Zfloor x)) (/2)) as [Hx|Hx].
assert (K: (Rabs (/2) <= /2)%R).
apply Req_le.
apply Rabs_pos_eq.
apply Rlt_le.
apply Rinv_0_lt_compat.
now apply (Z2R_lt 0 2).
destruct (Znearest_DN_or_UP x) as [H|H] ; rewrite H ; clear H.
now rewrite Hx.
rewrite Zceil_floor_neq.
rewrite plus_Z2R.
simpl.
replace (x - (Z2R (Zfloor x) + 1))%R with (x - Z2R (Zfloor x) - 1)%R by ring.
rewrite Hx.
rewrite Rabs_minus_sym.
now replace (1 - /2)%R with (/2)%R by field.
apply Rlt_not_eq.
apply Rplus_lt_reg_r with (- Z2R (Zfloor x))%R.
rewrite Rplus_opp_l, Rplus_comm.
fold (x - Z2R (Zfloor x))%R.
rewrite Hx.
apply Rinv_0_lt_compat.
now apply (Z2R_lt 0 2).
apply Rlt_le.
now apply Znearest_N_strict.
Qed.

Theorem Rmin_compare :
  forall x y,
  Rmin x y = match Rcompare x y with Lt => x | Eq => x | Gt => y end.
Proof.
intros x y.
unfold Rmin.
destruct (Rle_dec x y) as [[Hx|Hx]|Hx].
now rewrite Rcompare_Lt.
now rewrite Rcompare_Eq.
rewrite Rcompare_Gt.
easy.
now apply Rnot_le_lt.
Qed.

Theorem generic_N_pt :
  forall x,
  Rnd_N_pt generic_format x (rounding ZrndN x).
Proof.
intros x.
set (d := rounding ZrndDN x).
set (u := rounding ZrndUP x).
set (mx := scaled_mantissa x).
set (bx := bpow (canonic_exponent x)).
(* . *)
assert (H: (Rabs (rounding ZrndN x - x) <= Rmin (x - d) (u - x))%R).
pattern x at -1 ; rewrite <- scaled_mantissa_bpow.
unfold d, u, rounding, ZrndN, ZrndDN, ZrndUP, F2R. simpl.
fold mx bx.
rewrite <- 3!Rmult_minus_distr_r.
rewrite Rabs_mult, (Rabs_pos_eq bx). 2: apply bpow_ge_0.
rewrite <- Rmult_min_distr_r. 2: apply bpow_ge_0.
apply Rmult_le_compat_r.
apply bpow_ge_0.
unfold Znearest.
destruct (Req_dec (Z2R (Zfloor mx)) mx) as [Hm|Hm].
(* .. *)
rewrite Hm.
unfold Rminus at 2.
rewrite Rplus_opp_r.
rewrite Rcompare_Lt.
rewrite Hm.
unfold Rminus at -3.
rewrite Rplus_opp_r.
rewrite Rabs_R0.
unfold Rmin.
destruct (Rle_dec 0 (Z2R (Zceil mx) - mx)) as [H|H].
apply Rle_refl.
apply Rle_0_minus.
apply Zceil_ub.
apply Rinv_0_lt_compat.
now apply (Z2R_lt 0 2).
(* .. *)
rewrite Rcompare_floor_ceil_mid with (1 := Hm).
rewrite Rmin_compare.
assert (H: (Rabs (mx - Z2R (Zfloor mx)) <= mx - Z2R (Zfloor mx))%R).
rewrite Rabs_pos_eq.
apply Rle_refl.
apply Rle_0_minus.
apply Zfloor_lb.
case Rcompare_spec ; intros Hm'.
now rewrite Rabs_minus_sym.
case (choice mx).
rewrite <- Hm'.
exact H.
now rewrite Rabs_minus_sym.
rewrite Rabs_pos_eq.
apply Rle_refl.
apply Rle_0_minus.
apply Zceil_ub.
(* . *)
apply Rnd_DN_UP_pt_N with d u.
now apply generic_format_rounding.
now apply generic_DN_pt.
now apply generic_UP_pt.
apply Rle_trans with (1 := H).
apply Rmin_l.
apply Rle_trans with (1 := H).
apply Rmin_r.
Qed.

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End Znearest.

Section ZrndN_opp.

Theorem Znearest_opp :
  forall choice x,
  Znearest choice (- x) = (- Znearest (fun t => negb (choice (-t)%R)) x)%Z.
Proof.
intros choice x.
destruct (Req_dec (Z2R (Zfloor x)) x) as [Hx|Hx].
rewrite <- Hx.
rewrite <- opp_Z2R.
now rewrite 2!Znearest_Z2R.
unfold Znearest.
replace (- x - Z2R (Zfloor (-x)))%R with (Z2R (Zceil x) - x)%R.
rewrite Rcompare_ceil_floor_mid with (1 := Hx).
rewrite Rcompare_floor_ceil_mid with (1 := Hx).
rewrite Rcompare_sym.
unfold Zceil.
rewrite Ropp_involutive.
case Rcompare_spec ; simpl ; trivial.
intros H.
case (choice (-x)%R); simpl; trivial.
now rewrite Zopp_involutive.
intros _.
now rewrite Zopp_involutive.
unfold Zceil.
rewrite opp_Z2R.
apply Rplus_comm.
Qed.

1410
Theorem rounding_N_opp :
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  forall choice,
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  forall x,
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  rounding (ZrndN choice) (-x) = (- rounding (ZrndN (fun t => negb (choice (-t)%R))) x)%R.
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Proof.
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intros choice x.
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unfold rounding, F2R. simpl.
rewrite canonic_exponent_opp.
rewrite scaled_mantissa_opp.
rewrite Znearest_opp.
rewrite opp_Z2R.
now rewrite Ropp_mult_distr_l_reverse.
Qed.

1424
End ZrndN_opp.
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End RND_generic.