lean2/library/data/real/order.lean
2015-12-05 23:50:01 -08:00

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/-
Copyright (c) 2015 Robert Y. Lewis. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Author: Robert Y. Lewis
The real numbers, constructed as equivalence classes of Cauchy sequences of rationals.
This construction follows Bishop and Bridges (1985).
To do:
o Rename things and possibly make theorems private
-/
import data.real.basic data.rat data.nat
open rat nat eq pnat
local postfix `⁻¹` := pnat.inv
namespace rat_seq
definition pos (s : seq) := ∃ n : +, n⁻¹ < (s n)
definition nonneg (s : seq) := ∀ n : +, -(n⁻¹) ≤ s n
theorem sub_sub_comm (a b c : ) : a - b - c = a - c - b :=
by rewrite [+sub_eq_add_neg, add.assoc, {-b+_}add.comm, -add.assoc]
theorem bdd_away_of_pos {s : seq} (Hs : regular s) (H : pos s) :
∃ N : +, ∀ n : +, n ≥ N → (s n) ≥ N⁻¹ :=
begin
cases H with [n, Hn],
cases sep_by_inv Hn with [N, HN],
existsi N,
intro m Hm,
have Habs : abs (s m - s n) ≥ s n - s m, by rewrite abs_sub; apply le_abs_self,
have Habs' : s m + abs (s m - s n) ≥ s n, from (iff.mpr (le_add_iff_sub_left_le _ _ _)) Habs,
have HN' : N⁻¹ + N⁻¹ ≤ s n - n⁻¹, begin
rewrite sub_eq_add_neg,
apply iff.mpr (le_add_iff_sub_right_le _ _ _),
rewrite [sub_neg_eq_add, add.comm, -add.assoc],
apply le_of_lt HN
end,
rewrite add.comm at Habs',
have Hin : s m ≥ N⁻¹, from calc
s m ≥ s n - abs (s m - s n) : (iff.mp (le_add_iff_sub_left_le _ _ _)) Habs'
... ≥ s n - (m⁻¹ + n⁻¹) : sub_le_sub_left !Hs
... = s n - m⁻¹ - n⁻¹ : by rewrite sub_add_eq_sub_sub
... = s n - n⁻¹ - m⁻¹ : by rewrite sub_sub_comm
... ≥ s n - n⁻¹ - N⁻¹ : sub_le_sub_left (inv_ge_of_le Hm)
... ≥ N⁻¹ + N⁻¹ - N⁻¹ : sub_le_sub_right HN'
... = N⁻¹ : by rewrite add_sub_cancel,
apply Hin
end
theorem pos_of_bdd_away {s : seq} (H : ∃ N : +, ∀ n : +, n ≥ N → (s n) ≥ N⁻¹) : pos s :=
begin
cases H with [N, HN],
existsi (N + pone),
apply lt_of_lt_of_le,
apply inv_add_lt_left,
apply HN,
apply pnat.le_of_lt,
apply lt_add_left
end
theorem bdd_within_of_nonneg {s : seq} (Hs : regular s) (H : nonneg s) :
∀ n : +, ∃ N : +, ∀ m : +, m ≥ N → s m ≥ -n⁻¹ :=
begin
intros,
existsi n,
intro m Hm,
apply le.trans,
apply neg_le_neg,
apply inv_ge_of_le,
apply Hm,
apply H
end
theorem nonneg_of_bdd_within {s : seq} (Hs : regular s)
(H : ∀n : +, ∃ N : +, ∀ m : +, m ≥ N → s m ≥ -n⁻¹) : nonneg s :=
begin
rewrite ↑nonneg,
intro k,
apply ge_of_forall_ge_sub,
intro ε Hε,
cases H (pceil ((2) / ε)) with [N, HN],
apply le.trans,
rotate 1,
apply sub_le_of_abs_sub_le_left,
apply Hs,
apply (max (pceil ((2)/ε)) N),
rewrite [+sub_eq_add_neg, neg_add, {_ + (-k⁻¹ + _)}add.comm, *add.assoc],
apply rat.add_le_add_left,
apply le.trans,
rotate 1,
apply add_le_add,
rotate 1,
apply HN (max (pceil ((2)/ε)) N) !pnat.max_right,
rotate_right 1,
apply neg_le_neg,
apply inv_ge_of_le,
apply pnat.max_left,
rewrite -neg_add,
apply neg_le_neg,
apply le.trans,
apply add_le_add,
repeat (apply inv_pceil_div;
apply add_pos;
repeat apply zero_lt_one;
exact Hε),
rewrite [add_halves],
apply rat.le_refl
end
theorem pos_of_pos_equiv {s t : seq} (Hs : regular s) (Heq : s ≡ t) (Hp : pos s) : pos t :=
begin
cases (bdd_away_of_pos Hs Hp) with [N, HN],
existsi 2 * 2 * N,
apply lt_of_lt_of_le,
rotate 1,
apply sub_le_of_abs_sub_le_right,
apply Heq,
have Hs4 : N⁻¹ ≤ s (2 * 2 * N), from HN _ (!pnat.mul_le_mul_left),
apply lt_of_lt_of_le,
rotate 1,
rewrite sub_eq_add_neg,
apply iff.mpr !add_le_add_right_iff,
apply Hs4,
rewrite [*pnat.mul_assoc, pnat.add_halves, -(pnat.add_halves N), -sub_eq_add_neg, add_sub_cancel],
apply inv_two_mul_lt_inv
end
theorem nonneg_of_nonneg_equiv {s t : seq} (Hs : regular s) (Ht : regular t) (Heq : s ≡ t)
(Hp : nonneg s) : nonneg t :=
begin
apply nonneg_of_bdd_within,
apply Ht,
intros,
cases bdd_within_of_nonneg Hs Hp (2 * 2 * n) with [Ns, HNs],
existsi max Ns (2 * 2 * n),
intro m Hm,
apply le.trans,
rotate 1,
apply sub_le_of_abs_sub_le_right,
apply Heq,
apply le.trans,
rotate 1,
apply sub_le_sub_right,
apply HNs,
apply pnat.le_trans,
rotate 1,
apply Hm,
rotate_right 1,
apply pnat.max_left,
have Hms : m⁻¹ ≤ (2 * 2 * n)⁻¹, begin
apply inv_ge_of_le,
apply pnat.le_trans,
rotate 1,
apply Hm;
apply pnat.max_right
end,
have Hms' : m⁻¹ + m⁻¹ ≤ (2 * 2 * n)⁻¹ + (2 * 2 * n)⁻¹, from add_le_add Hms Hms,
apply le.trans,
rotate 1,
apply sub_le_sub_left,
apply Hms',
rewrite [*pnat.mul_assoc, pnat.add_halves, -neg_sub, -pnat.add_halves n, sub_neg_eq_add],
apply neg_le_neg,
apply add_le_add_left,
apply inv_two_mul_le_inv
end
definition s_le (a b : seq) := nonneg (sadd b (sneg a))
definition s_lt (a b : seq) := pos (sadd b (sneg a))
theorem zero_nonneg : nonneg zero :=
begin
intros,
apply neg_nonpos_of_nonneg,
apply rat.le_of_lt,
apply pnat.inv_pos
end
theorem s_zero_lt_one : s_lt zero one :=
begin
rewrite [↑s_lt, ↑zero, ↑sadd, ↑sneg, ↑one, neg_zero, add_zero, ↑pos],
existsi 2,
apply inv_lt_one_of_gt,
apply one_lt_two
end
protected theorem le_refl {s : seq} (Hs : regular s) : s_le s s :=
begin
apply nonneg_of_nonneg_equiv,
rotate 2,
apply equiv.symm,
apply neg_s_cancel s Hs,
apply zero_nonneg,
apply zero_is_reg,
apply reg_add_reg Hs (reg_neg_reg Hs)
end
theorem s_nonneg_of_pos {s : seq} (Hs : regular s) (H : pos s) : nonneg s :=
begin
apply nonneg_of_bdd_within,
apply Hs,
intros,
cases bdd_away_of_pos Hs H with [N, HN],
existsi N,
intro m Hm,
apply le.trans,
rotate 1,
apply HN,
apply Hm,
apply le.trans,
rotate 1,
apply rat.le_of_lt,
apply pnat.inv_pos,
rewrite -neg_zero,
apply neg_le_neg,
apply rat.le_of_lt,
apply pnat.inv_pos
end
theorem s_le_of_s_lt {s t : seq} (Hs : regular s) (Ht : regular t) (H : s_lt s t) : s_le s t :=
begin
rewrite [↑s_le, ↑s_lt at *],
apply s_nonneg_of_pos,
repeat (apply reg_add_reg | apply reg_neg_reg | assumption)
end
theorem s_neg_add_eq_s_add_neg (s t : seq) : sneg (sadd s t) ≡ sadd (sneg s) (sneg t) :=
begin
rewrite [↑equiv, ↑sadd, ↑sneg],
intros,
rewrite [neg_add, sub_self, abs_zero],
apply add_invs_nonneg
end
theorem equiv_cancel_middle {s t u : seq} (Hs : regular s) (Ht : regular t)
(Hu : regular u) : sadd (sadd u t) (sneg (sadd u s)) ≡ sadd t (sneg s) :=
begin
let Hz := zero_is_reg,
apply equiv.trans,
rotate 3,
apply add_well_defined,
rotate 4,
apply s_add_comm,
apply s_neg_add_eq_s_add_neg,
apply equiv.trans,
rotate 3,
apply s_add_assoc,
rotate 2,
apply add_well_defined,
rotate 4,
apply equiv.refl,
apply equiv.trans,
rotate 4,
apply equiv.refl,
rotate_right 1,
apply equiv.trans,
rotate 3,
apply equiv.symm,
apply s_add_assoc,
rotate 2,
apply equiv.trans,
rotate 4,
apply s_zero_add,
rotate_right 1,
apply add_well_defined,
rotate 4,
apply neg_s_cancel,
rotate 1,
apply equiv.refl,
repeat (apply reg_add_reg | apply reg_neg_reg | assumption)
end
protected theorem add_le_add_of_le_right {s t : seq} (Hs : regular s) (Ht : regular t)
(Lst : s_le s t) : ∀ u : seq, regular u → s_le (sadd u s) (sadd u t) :=
begin
intro u Hu,
rewrite [↑s_le at *],
apply nonneg_of_nonneg_equiv,
rotate 2,
apply equiv.symm,
apply equiv_cancel_middle,
repeat (apply reg_add_reg | apply reg_neg_reg | assumption)
end
theorem s_add_lt_add_left {s t : seq} (Hs : regular s) (Ht : regular t) (Hst : s_lt s t) {u : seq}
(Hu : regular u) : s_lt (sadd u s) (sadd u t) :=
begin
rewrite ↑s_lt at *,
apply pos_of_pos_equiv,
rotate 1,
apply equiv.symm,
apply equiv_cancel_middle,
repeat (apply reg_add_reg | apply reg_neg_reg | assumption)
end
protected theorem add_nonneg_of_nonneg {s t : seq} (Hs : nonneg s) (Ht : nonneg t) :
nonneg (sadd s t) :=
begin
intros,
rewrite [-pnat.add_halves, neg_add],
apply add_le_add,
apply Hs,
apply Ht
end
protected theorem le_trans {s t u : seq} (Hs : regular s) (Ht : regular t) (Hu : regular u)
(Lst : s_le s t) (Ltu : s_le t u) : s_le s u :=
begin
rewrite ↑s_le at *,
let Rz := zero_is_reg,
have Hsum : nonneg (sadd (sadd u (sneg t)) (sadd t (sneg s))),
from rat_seq.add_nonneg_of_nonneg Ltu Lst,
have H' : nonneg (sadd (sadd u (sadd (sneg t) t)) (sneg s)), begin
apply nonneg_of_nonneg_equiv,
rotate 2,
apply add_well_defined,
rotate 4,
apply s_add_assoc,
repeat (apply reg_add_reg | apply reg_neg_reg | assumption),
apply equiv.refl,
apply nonneg_of_nonneg_equiv,
rotate 2,
apply equiv.symm,
apply s_add_assoc,
rotate 2,
repeat (apply reg_add_reg | apply reg_neg_reg | assumption)
end,
have H'' : sadd (sadd u (sadd (sneg t) t)) (sneg s) ≡ sadd u (sneg s), begin
apply add_well_defined,
rotate 4,
apply equiv.trans,
rotate 3,
apply add_well_defined,
rotate 4,
apply equiv.refl,
apply s_neg_cancel,
rotate 1,
apply s_add_zero,
rotate 1,
apply equiv.refl,
repeat (apply reg_add_reg | apply reg_neg_reg | assumption)
end,
apply nonneg_of_nonneg_equiv,
rotate 2,
apply H'',
apply H',
repeat (apply reg_add_reg | apply reg_neg_reg | assumption)
end
theorem equiv_of_le_of_ge {s t : seq} (Hs : regular s) (Ht : regular t) (Lst : s_le s t)
(Lts : s_le t s) : s ≡ t :=
begin
apply equiv_of_diff_equiv_zero,
rotate 2,
rewrite [↑s_le at *, ↑nonneg at *, ↑equiv, ↑sadd at *, ↑sneg at *],
intros,
rewrite [↑zero, sub_zero],
apply abs_le_of_le_of_neg_le,
apply le_of_neg_le_neg,
rewrite [2 neg_add, neg_neg],
apply rat.le_trans,
apply neg_add_neg_le_neg_of_pos,
apply pnat.inv_pos,
rewrite add.comm,
apply Lst,
apply le_of_neg_le_neg,
rewrite [neg_add, neg_neg],
apply rat.le_trans,
apply neg_add_neg_le_neg_of_pos,
apply pnat.inv_pos,
apply Lts,
repeat assumption
end
definition sep (s t : seq) := s_lt s t s_lt t s
local infix `≢` : 50 := sep
theorem le_and_sep_of_lt {s t : seq} (Hs : regular s) (Ht : regular t) (Lst : s_lt s t) :
s_le s t ∧ sep s t :=
begin
apply and.intro,
intros,
cases Lst with [N, HN],
let Rns := reg_neg_reg Hs,
let Rtns := reg_add_reg Ht Rns,
let Habs := sub_le_of_abs_sub_le_right (Rtns N n),
rewrite [sub_add_eq_sub_sub at Habs],
exact (calc
sadd t (sneg s) n ≥ sadd t (sneg s) N - N⁻¹ - n⁻¹ : Habs
... ≥ 0 - n⁻¹: begin
apply sub_le_sub_right,
apply rat.le_of_lt,
apply (iff.mpr (sub_pos_iff_lt _ _)),
apply HN
end
... = -n⁻¹ : by rewrite zero_sub),
exact or.inl Lst
end
theorem lt_of_le_and_sep {s t : seq} (Hs : regular s) (Ht : regular t) (H : s_le s t ∧ sep s t) :
s_lt s t :=
begin
let Le := and.left H,
cases and.right H with [P, Hlt],
exact P,
rewrite [↑s_le at Le, ↑nonneg at Le, ↑s_lt at Hlt, ↑pos at Hlt],
apply exists.elim Hlt,
intro N HN,
let LeN := Le N,
let HN' := (iff.mpr !neg_lt_neg_iff_lt) HN,
rewrite [↑sadd at HN', ↑sneg at HN', neg_add at HN', neg_neg at HN', add.comm at HN'],
let HN'' := not_le_of_gt HN',
apply absurd LeN HN''
end
theorem lt_iff_le_and_sep {s t : seq} (Hs : regular s) (Ht : regular t) :
s_lt s t ↔ s_le s t ∧ sep s t :=
iff.intro (le_and_sep_of_lt Hs Ht) (lt_of_le_and_sep Hs Ht)
theorem s_neg_zero : sneg zero ≡ zero :=
begin
rewrite ↑[sneg, zero, equiv],
intros,
rewrite [sub_zero, abs_neg, abs_zero],
apply add_invs_nonneg
end
theorem s_sub_zero {s : seq} (Hs : regular s) : sadd s (sneg zero) ≡ s :=
begin
apply equiv.trans,
rotate 3,
apply add_well_defined,
rotate 4,
apply equiv.refl,
apply s_neg_zero,
apply s_add_zero,
repeat (assumption | apply reg_add_reg | apply reg_neg_reg | apply zero_is_reg)
end
theorem s_pos_of_gt_zero {s : seq} (Hs : regular s) (Hgz : s_lt zero s) : pos s :=
begin
rewrite [↑s_lt at *],
apply pos_of_pos_equiv,
rotate 1,
apply s_sub_zero,
repeat (assumption | apply reg_add_reg | apply reg_neg_reg),
apply zero_is_reg
end
theorem s_gt_zero_of_pos {s : seq} (Hs : regular s) (Hp : pos s) : s_lt zero s :=
begin
rewrite ↑s_lt,
apply pos_of_pos_equiv,
rotate 1,
apply equiv.symm,
apply s_sub_zero,
repeat assumption
end
theorem s_nonneg_of_ge_zero {s : seq} (Hs : regular s) (Hgz : s_le zero s) : nonneg s :=
begin
rewrite ↑s_le at *,
apply nonneg_of_nonneg_equiv,
rotate 2,
apply s_sub_zero,
repeat (assumption | apply reg_add_reg | apply reg_neg_reg | apply zero_is_reg)
end
theorem s_ge_zero_of_nonneg {s : seq} (Hs : regular s) (Hn : nonneg s) : s_le zero s :=
begin
rewrite ↑s_le,
apply nonneg_of_nonneg_equiv,
rotate 2,
apply equiv.symm,
apply s_sub_zero,
repeat (assumption | apply reg_add_reg | apply reg_neg_reg | apply zero_is_reg)
end
theorem s_mul_pos_of_pos {s t : seq} (Hs : regular s) (Ht : regular t) (Hps : pos s)
(Hpt : pos t) : pos (smul s t) :=
begin
rewrite [↑pos at *],
cases bdd_away_of_pos Hs Hps with [Ns, HNs],
cases bdd_away_of_pos Ht Hpt with [Nt, HNt],
existsi 2 * max Ns Nt * max Ns Nt,
rewrite ↑smul,
apply lt_of_lt_of_le,
rotate 1,
apply mul_le_mul,
apply HNs,
apply pnat.le_trans,
apply pnat.max_left Ns Nt,
rewrite -pnat.mul_assoc,
apply pnat.mul_le_mul_left,
apply HNt,
apply pnat.le_trans,
apply pnat.max_right Ns Nt,
rewrite -pnat.mul_assoc,
apply pnat.mul_le_mul_left,
apply rat.le_of_lt,
apply pnat.inv_pos,
apply rat.le_trans,
rotate 1,
apply HNs,
apply pnat.le_trans,
apply pnat.max_left Ns Nt,
rewrite -pnat.mul_assoc,
apply pnat.mul_le_mul_left,
rewrite pnat.inv_mul_eq_mul_inv,
apply mul_lt_mul,
rewrite [pnat.inv_mul_eq_mul_inv, -one_mul Ns⁻¹],
apply mul_lt_mul,
apply inv_lt_one_of_gt,
apply dec_trivial,
apply inv_ge_of_le,
apply pnat.max_left,
apply pnat.inv_pos,
apply rat.le_of_lt zero_lt_one,
apply inv_ge_of_le,
apply pnat.max_right,
apply pnat.inv_pos,
repeat (apply le_of_lt; apply pnat.inv_pos)
end
theorem s_mul_gt_zero_of_gt_zero {s t : seq} (Hs : regular s) (Ht : regular t)
(Hzs : s_lt zero s) (Hzt : s_lt zero t) : s_lt zero (smul s t) :=
s_gt_zero_of_pos
(reg_mul_reg Hs Ht)
(s_mul_pos_of_pos Hs Ht (s_pos_of_gt_zero Hs Hzs) (s_pos_of_gt_zero Ht Hzt))
theorem le_of_lt_or_equiv {s t : seq} (Hs : regular s) (Ht : regular t)
(Hor : (s_lt s t) (s ≡ t)) : s_le s t :=
or.elim Hor
(begin
intro Hlt,
apply s_le_of_s_lt Hs Ht Hlt
end)
(begin
intro Heq,
rewrite ↑s_le,
apply nonneg_of_nonneg_equiv,
rotate 3,
apply zero_nonneg,
apply zero_is_reg,
apply reg_add_reg Ht (reg_neg_reg Hs),
apply equiv.symm,
apply diff_equiv_zero_of_equiv,
rotate 2,
apply equiv.symm,
apply Heq,
repeat assumption
end)
theorem s_zero_mul {s : seq} : smul s zero ≡ zero :=
begin
rewrite [↑equiv, ↑smul, ↑zero],
intros,
rewrite [mul_zero, sub_zero, abs_zero],
apply add_invs_nonneg
end
theorem s_mul_nonneg_of_pos_of_zero {s t : seq} (Hs : regular s) (Ht : regular t)
(Hps : pos s) (Hpt : zero ≡ t) : nonneg (smul s t) :=
begin
apply nonneg_of_nonneg_equiv,
rotate 2,
apply mul_well_defined,
rotate 4,
apply equiv.refl,
apply Hpt,
apply nonneg_of_nonneg_equiv,
rotate 2,
apply equiv.symm,
apply s_zero_mul,
apply zero_nonneg,
repeat (assumption | apply reg_mul_reg | apply zero_is_reg)
end
theorem s_mul_nonneg_of_nonneg {s t : seq} (Hs : regular s) (Ht : regular t)
(Hps : nonneg s) (Hpt : nonneg t) : nonneg (smul s t) :=
begin
intro n,
rewrite ↑smul,
apply rat.le_by_cases 0 (s (((K₂ s t) * 2) * n)),
intro Hsp,
apply rat.le_by_cases 0 (t (((K₂ s t) * 2) * n)),
intro Htp,
apply rat.le_trans,
rotate 1,
apply rat.mul_nonneg Hsp Htp,
rotate_right 1,
apply le_of_lt,
apply neg_neg_of_pos,
apply pnat.inv_pos,
intro Htn,
apply rat.le_trans,
rotate 1,
apply mul_le_mul_of_nonpos_right,
apply rat.le_trans,
apply le_abs_self,
apply canon_2_bound_left s t Hs,
apply Htn,
rotate_right 1,
apply rat.le_trans,
rotate 1,
apply mul_le_mul_of_nonneg_left,
apply Hpt,
apply le_of_lt,
apply rat_of_pnat_is_pos,
rotate 1,
rewrite -neg_mul_eq_mul_neg,
apply neg_le_neg,
rewrite [*pnat.mul_assoc, pnat.inv_mul_eq_mul_inv, -mul.assoc, pnat.inv_cancel_left, one_mul],
apply inv_ge_of_le,
apply pnat.mul_le_mul_left,
intro Hsn,
apply rat.le_by_cases 0 (t (((K₂ s t) * 2) * n)),
intro Htp,
apply rat.le_trans,
rotate 1,
apply mul_le_mul_of_nonpos_left,
apply rat.le_trans,
apply le_abs_self,
apply canon_2_bound_right s t Ht,
apply Hsn,
rotate_right 1,
apply rat.le_trans,
rotate 1,
apply mul_le_mul_of_nonneg_right,
apply Hps,
apply le_of_lt,
apply rat_of_pnat_is_pos,
rotate 1,
rewrite -neg_mul_eq_neg_mul,
apply neg_le_neg,
rewrite [+pnat.mul_assoc, pnat.inv_mul_eq_mul_inv, mul.comm, -mul.assoc, pnat.inv_cancel_left,
one_mul],
apply inv_ge_of_le,
apply pnat.mul_le_mul_left,
intro Htn,
apply le.trans,
rotate 1,
apply mul_nonneg_of_nonpos_of_nonpos,
apply Hsn,
apply Htn,
apply le_of_lt,
apply neg_neg_of_pos,
apply pnat.inv_pos
end
theorem s_mul_ge_zero_of_ge_zero {s t : seq} (Hs : regular s) (Ht : regular t)
(Hzs : s_le zero s) (Hzt : s_le zero t) : s_le zero (smul s t) :=
begin
let Hzs' := s_nonneg_of_ge_zero Hs Hzs,
let Htz' := s_nonneg_of_ge_zero Ht Hzt,
apply s_ge_zero_of_nonneg,
rotate 1,
apply s_mul_nonneg_of_nonneg,
repeat assumption,
apply reg_mul_reg Hs Ht
end
protected theorem not_lt_self (s : seq) : ¬ s_lt s s :=
begin
intro Hlt,
rewrite [↑s_lt at Hlt, ↑pos at Hlt],
apply exists.elim Hlt,
intro n Hn, esimp at Hn,
rewrite [↑sadd at Hn,↑sneg at Hn, -sub_eq_add_neg at Hn, sub_self at Hn],
apply absurd Hn (not_lt_of_ge (rat.le_of_lt !pnat.inv_pos))
end
theorem not_sep_self (s : seq) : ¬ s ≢ s :=
begin
intro Hsep,
rewrite ↑sep at Hsep,
let Hsep' := (iff.mp !or_self) Hsep,
apply absurd Hsep' (!rat_seq.not_lt_self)
end
theorem le_well_defined {s t u v : seq} (Hs : regular s) (Ht : regular t) (Hu : regular u)
(Hv : regular v) (Hsu : s ≡ u) (Htv : t ≡ v) : s_le s t ↔ s_le u v :=
iff.intro
(begin
intro Hle,
rewrite [↑s_le at *],
apply nonneg_of_nonneg_equiv,
rotate 2,
apply add_well_defined,
rotate 4,
apply Htv,
apply neg_well_defined,
apply Hsu,
apply Hle,
repeat (apply reg_add_reg | apply reg_neg_reg | assumption)
end)
(begin
intro Hle,
rewrite [↑s_le at *],
apply nonneg_of_nonneg_equiv,
rotate 2,
apply add_well_defined,
rotate 4,
apply equiv.symm, apply Htv,
apply neg_well_defined,
apply equiv.symm, apply Hsu,
apply Hle,
repeat (apply reg_add_reg | apply reg_neg_reg | assumption)
end)
theorem lt_well_defined {s t u v : seq} (Hs : regular s) (Ht : regular t) (Hu : regular u)
(Hv : regular v) (Hsu : s ≡ u) (Htv : t ≡ v) : s_lt s t ↔ s_lt u v :=
iff.intro
(begin
intro Hle,
rewrite [↑s_lt at *],
apply pos_of_pos_equiv,
rotate 1,
apply add_well_defined,
rotate 4,
apply Htv,
apply neg_well_defined,
apply Hsu,
apply Hle,
repeat (apply reg_add_reg | apply reg_neg_reg | assumption)
end)
(begin
intro Hle,
rewrite [↑s_lt at *],
apply pos_of_pos_equiv,
rotate 1,
apply add_well_defined,
rotate 4,
apply equiv.symm, apply Htv,
apply neg_well_defined,
apply equiv.symm, apply Hsu,
apply Hle,
repeat (apply reg_add_reg | apply reg_neg_reg | assumption)
end)
theorem sep_well_defined {s t u v : seq} (Hs : regular s) (Ht : regular t) (Hu : regular u)
(Hv : regular v) (Hsu : s ≡ u) (Htv : t ≡ v) : s ≢ t ↔ u ≢ v :=
begin
rewrite ↑sep,
apply iff.intro,
intro Hor,
apply or.elim Hor,
intro Hlt,
apply or.inl,
apply iff.mp (lt_well_defined Hs Ht Hu Hv Hsu Htv),
assumption,
intro Hlt,
apply or.inr,
apply iff.mp (lt_well_defined Ht Hs Hv Hu Htv Hsu),
assumption,
intro Hor,
apply or.elim Hor,
intro Hlt,
apply or.inl,
apply iff.mpr (lt_well_defined Hs Ht Hu Hv Hsu Htv),
assumption,
intro Hlt,
apply or.inr,
apply iff.mpr (lt_well_defined Ht Hs Hv Hu Htv Hsu),
assumption
end
theorem s_lt_of_lt_of_le {s t u : seq} (Hs : regular s) (Ht : regular t) (Hu : regular u)
(Hst : s_lt s t) (Htu : s_le t u) : s_lt s u :=
begin
let Rtns := reg_add_reg Ht (reg_neg_reg Hs),
let Runt := reg_add_reg Hu (reg_neg_reg Ht),
have Hcan : ∀ m, sadd u (sneg s) m = (sadd t (sneg s)) m + (sadd u (sneg t)) m, begin
intro m,
rewrite [↑sadd, ↑sneg, -*sub_eq_add_neg, -sub_eq_sub_add_sub]
end,
rewrite [↑s_lt at *, ↑s_le at *],
cases bdd_away_of_pos Rtns Hst with [Nt, HNt],
cases bdd_within_of_nonneg Runt Htu (2 * Nt) with [Nu, HNu],
apply pos_of_bdd_away,
existsi max (2 * Nt) Nu,
intro n Hn,
rewrite Hcan,
apply rat.le_trans,
rotate 1,
apply add_le_add,
apply HNt,
apply pnat.le_trans,
apply pnat.mul_le_mul_left 2,
apply pnat.le_trans,
rotate 1,
apply Hn,
rotate_right 1,
apply pnat.max_left,
apply HNu,
apply pnat.le_trans,
rotate 1,
apply Hn,
rotate_right 1,
apply pnat.max_right,
rewrite [-pnat.add_halves Nt, -sub_eq_add_neg, add_sub_cancel],
apply inv_ge_of_le,
apply pnat.max_left
end
theorem s_lt_of_le_of_lt {s t u : seq} (Hs : regular s) (Ht : regular t) (Hu : regular u)
(Hst : s_le s t) (Htu : s_lt t u) : s_lt s u :=
begin
let Rtns := reg_add_reg Ht (reg_neg_reg Hs),
let Runt := reg_add_reg Hu (reg_neg_reg Ht),
have Hcan : ∀ m, sadd u (sneg s) m = (sadd t (sneg s)) m + (sadd u (sneg t)) m, begin
intro m,
rewrite [↑sadd, ↑sneg, -*sub_eq_add_neg, -sub_eq_sub_add_sub]
end,
rewrite [↑s_lt at *, ↑s_le at *],
cases bdd_away_of_pos Runt Htu with [Nu, HNu],
cases bdd_within_of_nonneg Rtns Hst (2 * Nu) with [Nt, HNt],
apply pos_of_bdd_away,
existsi max (2 * Nu) Nt,
intro n Hn,
rewrite Hcan,
apply rat.le_trans,
rotate 1,
apply add_le_add,
apply HNt,
apply pnat.le_trans,
rotate 1,
apply Hn,
rotate_right 1,
apply pnat.max_right,
apply HNu,
apply pnat.le_trans,
apply pnat.mul_le_mul_left 2,
apply pnat.le_trans,
rotate 1,
apply Hn,
rotate_right 1,
apply pnat.max_left,
rewrite [-pnat.add_halves Nu, neg_add_cancel_left],
apply inv_ge_of_le,
apply pnat.max_left
end
theorem le_of_le_reprs {s t : seq} (Hs : regular s) (Ht : regular t)
(Hle : ∀ n : +, s_le s (const (t n))) : s_le s t :=
by intro m; apply Hle (2 * m) m
theorem le_of_reprs_le {s t : seq} (Hs : regular s) (Ht : regular t)
(Hle : ∀ n : +, s_le (const (t n)) s) : s_le t s :=
by intro m; apply Hle (2 * m) m
-----------------------------
-- of_rat theorems
theorem const_le_const_of_le {a b : } (H : a ≤ b) : s_le (const a) (const b) :=
begin
rewrite [↑s_le, ↑nonneg],
intro n,
rewrite [↑sadd, ↑sneg, ↑const],
apply le.trans,
apply neg_nonpos_of_nonneg,
apply rat.le_of_lt,
apply pnat.inv_pos,
apply iff.mpr !sub_nonneg_iff_le,
apply H
end
theorem le_of_const_le_const {a b : } (H : s_le (const a) (const b)) : a ≤ b :=
begin
rewrite [↑s_le at H, ↑nonneg at H, ↑sadd at H, ↑sneg at H, ↑const at H],
apply iff.mp !sub_nonneg_iff_le,
apply nonneg_of_ge_neg_invs _ H
end
theorem nat_inv_lt_rat {a : } (H : a > 0) : ∃ n : +, n⁻¹ < a :=
begin
existsi (pceil (1 / (a / (2)))),
apply lt_of_le_of_lt,
rotate 1,
apply div_two_lt_of_pos H,
rewrite -(one_div_one_div (a / (1 + 1))),
apply pceil_helper,
apply pnat.le_refl,
apply one_div_pos_of_pos,
apply div_pos_of_pos_of_pos H dec_trivial
end
theorem const_lt_const_of_lt {a b : } (H : a < b) : s_lt (const a) (const b) :=
begin
rewrite [↑s_lt, ↑pos, ↑sadd, ↑sneg, ↑const],
apply nat_inv_lt_rat,
apply (iff.mpr !sub_pos_iff_lt H)
end
theorem lt_of_const_lt_const {a b : } (H : s_lt (const a) (const b)) : a < b :=
begin
rewrite [↑s_lt at H, ↑pos at H, ↑const at H, ↑sadd at H, ↑sneg at H],
cases H with [n, Hn],
apply (iff.mp !sub_pos_iff_lt),
apply lt.trans,
rotate 1,
exact Hn,
apply pnat.inv_pos
end
theorem s_le_of_le_pointwise {s t : seq} (Hs : regular s) (Ht : regular t)
(H : ∀ n : +, s n ≤ t n) : s_le s t :=
begin
rewrite [↑s_le, ↑nonneg, ↑sadd, ↑sneg],
intros,
apply le.trans,
apply iff.mpr !neg_nonpos_iff_nonneg,
apply le_of_lt,
apply pnat.inv_pos,
apply iff.mpr !sub_nonneg_iff_le,
apply H
end
-------- lift to reg_seqs
definition r_lt (s t : reg_seq) := s_lt (reg_seq.sq s) (reg_seq.sq t)
definition r_le (s t : reg_seq) := s_le (reg_seq.sq s) (reg_seq.sq t)
definition r_sep (s t : reg_seq) := sep (reg_seq.sq s) (reg_seq.sq t)
theorem r_le_well_defined (s t u v : reg_seq) (Hsu : requiv s u) (Htv : requiv t v)
: r_le s t = r_le u v :=
propext (le_well_defined (reg_seq.is_reg s) (reg_seq.is_reg t) (reg_seq.is_reg u)
(reg_seq.is_reg v) Hsu Htv)
theorem r_lt_well_defined (s t u v : reg_seq) (Hsu : requiv s u) (Htv : requiv t v)
: r_lt s t = r_lt u v :=
propext (lt_well_defined (reg_seq.is_reg s) (reg_seq.is_reg t) (reg_seq.is_reg u)
(reg_seq.is_reg v) Hsu Htv)
theorem r_sep_well_defined (s t u v : reg_seq) (Hsu : requiv s u) (Htv : requiv t v)
: r_sep s t = r_sep u v :=
propext (sep_well_defined (reg_seq.is_reg s) (reg_seq.is_reg t) (reg_seq.is_reg u)
(reg_seq.is_reg v) Hsu Htv)
theorem r_le.refl (s : reg_seq) : r_le s s := rat_seq.le_refl (reg_seq.is_reg s)
theorem r_le.trans {s t u : reg_seq} (Hst : r_le s t) (Htu : r_le t u) : r_le s u :=
rat_seq.le_trans (reg_seq.is_reg s) (reg_seq.is_reg t) (reg_seq.is_reg u) Hst Htu
theorem r_equiv_of_le_of_ge {s t : reg_seq} (Hs : r_le s t) (Hu : r_le t s) :
requiv s t :=
equiv_of_le_of_ge (reg_seq.is_reg s) (reg_seq.is_reg t) Hs Hu
theorem r_lt_iff_le_and_sep (s t : reg_seq) : r_lt s t ↔ r_le s t ∧ r_sep s t :=
lt_iff_le_and_sep (reg_seq.is_reg s) (reg_seq.is_reg t)
theorem r_add_le_add_of_le_right {s t : reg_seq} (H : r_le s t) (u : reg_seq) :
r_le (u + s) (u + t) :=
rat_seq.add_le_add_of_le_right (reg_seq.is_reg s) (reg_seq.is_reg t) H
(reg_seq.sq u) (reg_seq.is_reg u)
theorem r_add_le_add_of_le_right_var (s t u : reg_seq) (H : r_le s t) :
r_le (u + s) (u + t) := r_add_le_add_of_le_right H u
theorem r_mul_pos_of_pos {s t : reg_seq} (Hs : r_lt r_zero s) (Ht : r_lt r_zero t) :
r_lt r_zero (s * t) :=
s_mul_gt_zero_of_gt_zero (reg_seq.is_reg s) (reg_seq.is_reg t) Hs Ht
theorem r_mul_nonneg_of_nonneg {s t : reg_seq} (Hs : r_le r_zero s) (Ht : r_le r_zero t) :
r_le r_zero (s * t) :=
s_mul_ge_zero_of_ge_zero (reg_seq.is_reg s) (reg_seq.is_reg t) Hs Ht
theorem r_not_lt_self (s : reg_seq) : ¬ r_lt s s :=
rat_seq.not_lt_self (reg_seq.sq s)
theorem r_not_sep_self (s : reg_seq) : ¬ r_sep s s :=
not_sep_self (reg_seq.sq s)
theorem r_le_of_lt {s t : reg_seq} (H : r_lt s t) : r_le s t :=
s_le_of_s_lt (reg_seq.is_reg s) (reg_seq.is_reg t) H
theorem r_lt_of_le_of_lt {s t u : reg_seq} (Hst : r_le s t) (Htu : r_lt t u) : r_lt s u :=
s_lt_of_le_of_lt (reg_seq.is_reg s) (reg_seq.is_reg t) (reg_seq.is_reg u) Hst Htu
theorem r_lt_of_lt_of_le {s t u : reg_seq} (Hst : r_lt s t) (Htu : r_le t u) : r_lt s u :=
s_lt_of_lt_of_le (reg_seq.is_reg s) (reg_seq.is_reg t) (reg_seq.is_reg u) Hst Htu
theorem r_add_lt_add_left (s t : reg_seq) (H : r_lt s t) (u : reg_seq) : r_lt (u + s) (u + t) :=
s_add_lt_add_left (reg_seq.is_reg s) (reg_seq.is_reg t) H (reg_seq.is_reg u)
theorem r_add_lt_add_left_var (s t u : reg_seq) (H : r_lt s t) : r_lt (u + s) (u + t) :=
r_add_lt_add_left s t H u
theorem r_zero_lt_one : r_lt r_zero r_one := s_zero_lt_one
theorem r_le_of_lt_or_eq (s t : reg_seq) (H : r_lt s t requiv s t) : r_le s t :=
le_of_lt_or_equiv (reg_seq.is_reg s) (reg_seq.is_reg t) H
theorem r_const_le_const_of_le {a b : } (H : a ≤ b) : r_le (r_const a) (r_const b) :=
const_le_const_of_le H
theorem r_le_of_const_le_const {a b : } (H : r_le (r_const a) (r_const b)) : a ≤ b :=
le_of_const_le_const H
theorem r_const_lt_const_of_lt {a b : } (H : a < b) : r_lt (r_const a) (r_const b) :=
const_lt_const_of_lt H
theorem r_lt_of_const_lt_const {a b : } (H : r_lt (r_const a) (r_const b)) : a < b :=
lt_of_const_lt_const H
theorem r_le_of_le_reprs (s t : reg_seq) (Hle : ∀ n : +, r_le s (r_const (reg_seq.sq t n))) : r_le s t :=
le_of_le_reprs (reg_seq.is_reg s) (reg_seq.is_reg t) Hle
theorem r_le_of_reprs_le (s t : reg_seq) (Hle : ∀ n : +, r_le (r_const (reg_seq.sq t n)) s) :
r_le t s :=
le_of_reprs_le (reg_seq.is_reg s) (reg_seq.is_reg t) Hle
end rat_seq
open real
open [classes] rat_seq
namespace real
protected definition lt (x y : ) :=
quot.lift_on₂ x y (λ a b, rat_seq.r_lt a b) rat_seq.r_lt_well_defined
protected definition le (x y : ) :=
quot.lift_on₂ x y (λ a b, rat_seq.r_le a b) rat_seq.r_le_well_defined
definition real_has_lt [reducible] [instance] [priority real.prio] : has_lt :=
has_lt.mk real.lt
definition real_has_le [reducible] [instance] [priority real.prio] : has_le :=
has_le.mk real.le
definition sep (x y : ) := quot.lift_on₂ x y (λ a b, rat_seq.r_sep a b) rat_seq.r_sep_well_defined
infix `≢` : 50 := sep
protected theorem le_refl (x : ) : x ≤ x :=
quot.induction_on x (λ t, rat_seq.r_le.refl t)
protected theorem le_trans {x y z : } : x ≤ y → y ≤ z → x ≤ z :=
quot.induction_on₃ x y z (λ s t u, rat_seq.r_le.trans)
protected theorem eq_of_le_of_ge {x y : } : x ≤ y → y ≤ x → x = y :=
quot.induction_on₂ x y (λ s t Hst Hts, quot.sound (rat_seq.r_equiv_of_le_of_ge Hst Hts))
theorem lt_iff_le_and_sep (x y : ) : x < y ↔ x ≤ y ∧ x ≢ y :=
quot.induction_on₂ x y (λ s t, rat_seq.r_lt_iff_le_and_sep s t)
protected theorem add_le_add_left' (x y z : ) : x ≤ y → z + x ≤ z + y :=
quot.induction_on₃ x y z (λ s t u, rat_seq.r_add_le_add_of_le_right_var s t u)
protected theorem add_le_add_left (x y : ) : x ≤ y → ∀ z : , z + x ≤ z + y :=
take H z, real.add_le_add_left' x y z H
protected theorem mul_pos (x y : ) : 0 < x → 0 < y → 0 < x * y :=
quot.induction_on₂ x y (λ s t, rat_seq.r_mul_pos_of_pos)
protected theorem mul_nonneg (x y : ) : 0 ≤ x → 0 ≤ y → 0 ≤ x * y :=
quot.induction_on₂ x y (λ s t, rat_seq.r_mul_nonneg_of_nonneg)
theorem not_sep_self (x : ) : ¬ x ≢ x :=
quot.induction_on x (λ s, rat_seq.r_not_sep_self s)
protected theorem lt_irrefl (x : ) : ¬ x < x :=
quot.induction_on x (λ s, rat_seq.r_not_lt_self s)
protected theorem le_of_lt {x y : } : x < y → x ≤ y :=
quot.induction_on₂ x y (λ s t H', rat_seq.r_le_of_lt H')
protected theorem lt_of_le_of_lt {x y z : } : x ≤ y → y < z → x < z :=
quot.induction_on₃ x y z (λ s t u H H', rat_seq.r_lt_of_le_of_lt H H')
protected theorem lt_of_lt_of_le {x y z : } : x < y → y ≤ z → x < z :=
quot.induction_on₃ x y z (λ s t u H H', rat_seq.r_lt_of_lt_of_le H H')
protected theorem add_lt_add_left' (x y z : ) : x < y → z + x < z + y :=
quot.induction_on₃ x y z (λ s t u, rat_seq.r_add_lt_add_left_var s t u)
protected theorem add_lt_add_left (x y : ) : x < y → ∀ z : , z + x < z + y :=
take H z, real.add_lt_add_left' x y z H
protected theorem zero_lt_one : (0 : ) < (1 : ) := rat_seq.r_zero_lt_one
protected theorem le_of_lt_or_eq (x y : ) : x < y x = y → x ≤ y :=
(quot.induction_on₂ x y (λ s t H, or.elim H (take H', begin
apply rat_seq.r_le_of_lt_or_eq,
apply or.inl H'
end)
(take H', begin
apply rat_seq.r_le_of_lt_or_eq,
apply (or.inr (quot.exact H'))
end)))
definition ordered_ring [reducible] [instance] : ordered_ring :=
⦃ ordered_ring, real.comm_ring,
le_refl := real.le_refl,
le_trans := @real.le_trans,
mul_pos := real.mul_pos,
mul_nonneg := real.mul_nonneg,
zero_ne_one := real.zero_ne_one,
add_le_add_left := real.add_le_add_left,
le_antisymm := @real.eq_of_le_of_ge,
lt_irrefl := real.lt_irrefl,
lt_of_le_of_lt := @real.lt_of_le_of_lt,
lt_of_lt_of_le := @real.lt_of_lt_of_le,
le_of_lt := @real.le_of_lt,
add_lt_add_left := real.add_lt_add_left
open int
theorem of_rat_sub (a b : ) : of_rat (a - b) = of_rat a - of_rat b := rfl
theorem of_int_sub (a b : ) : of_int (a - b) = of_int a - of_int b :=
by rewrite [of_int_eq, rat.of_int_sub, of_rat_sub]
theorem of_rat_le_of_rat_of_le {a b : } : a ≤ b → of_rat a ≤ of_rat b :=
rat_seq.r_const_le_const_of_le
theorem le_of_of_rat_le_of_rat {a b : } : of_rat a ≤ of_rat b → a ≤ b :=
rat_seq.r_le_of_const_le_const
theorem of_rat_le_of_rat_iff (a b : ) : of_rat a ≤ of_rat b ↔ a ≤ b :=
iff.intro le_of_of_rat_le_of_rat of_rat_le_of_rat_of_le
theorem of_rat_lt_of_rat_of_lt {a b : } : a < b → of_rat a < of_rat b :=
rat_seq.r_const_lt_const_of_lt
theorem lt_of_of_rat_lt_of_rat {a b : } : of_rat a < of_rat b → a < b :=
rat_seq.r_lt_of_const_lt_const
theorem of_rat_lt_of_rat_iff (a b : ) : of_rat a < of_rat b ↔ a < b :=
iff.intro lt_of_of_rat_lt_of_rat of_rat_lt_of_rat_of_lt
theorem of_int_le_of_int_iff (a b : ) : of_int a ≤ of_int b ↔ (a ≤ b) :=
begin rewrite [+of_int_eq, of_rat_le_of_rat_iff], apply rat.of_int_le_of_int_iff end
theorem of_int_le_of_int_of_le {a b : } : (a ≤ b) → of_int a ≤ of_int b :=
iff.mpr !of_int_le_of_int_iff
theorem le_of_of_int_le_of_int {a b : } : of_int a ≤ of_int b → (a ≤ b) :=
iff.mp !of_int_le_of_int_iff
theorem of_int_lt_of_int_iff (a b : ) : of_int a < of_int b ↔ (a < b) :=
by rewrite [*of_int_eq, of_rat_lt_of_rat_iff]; apply rat.of_int_lt_of_int_iff
theorem of_int_lt_of_int_of_lt {a b : } : (a < b) → of_int a < of_int b :=
iff.mpr !of_int_lt_of_int_iff
theorem lt_of_of_int_lt_of_int {a b : } : of_int a < of_int b → (a < b) :=
iff.mp !of_int_lt_of_int_iff
theorem of_nat_le_of_nat_iff (a b : ) : of_nat a ≤ of_nat b ↔ (a ≤ b) :=
by rewrite [*of_nat_eq, of_rat_le_of_rat_iff]; apply rat.of_nat_le_of_nat_iff
theorem of_nat_le_of_nat_of_le {a b : } : (a ≤ b) → of_nat a ≤ of_nat b :=
iff.mpr !of_nat_le_of_nat_iff
theorem le_of_of_nat_le_of_nat {a b : } : of_nat a ≤ of_nat b → (a ≤ b) :=
iff.mp !of_nat_le_of_nat_iff
theorem of_nat_lt_of_nat_iff (a b : ) : of_nat a < of_nat b ↔ (a < b) :=
by rewrite [*of_nat_eq, of_rat_lt_of_rat_iff]; apply rat.of_nat_lt_of_nat_iff
theorem of_nat_lt_of_nat_of_lt {a b : } : (a < b) → of_nat a < of_nat b :=
iff.mpr !of_nat_lt_of_nat_iff
theorem lt_of_of_nat_lt_of_nat {a b : } : of_nat a < of_nat b → (a < b) :=
iff.mp !of_nat_lt_of_nat_iff
theorem of_nat_nonneg (a : ) : of_nat a ≥ 0 :=
of_rat_le_of_rat_of_le !rat.of_nat_nonneg
theorem of_rat_pow (a : ) (n : ) : of_rat (a^n) = (of_rat a)^n :=
begin
induction n with n ih,
apply eq.refl,
rewrite [2 pow_succ, of_rat_mul, ih]
end
theorem of_int_pow (a : ) (n : ) : of_int (#int a^n) = (of_int a)^n :=
by rewrite [of_int_eq, rat.of_int_pow, of_rat_pow]
theorem of_nat_pow (a : ) (n : ) : of_nat (#nat a^n) = (of_nat a)^n :=
by rewrite [of_nat_eq, rat.of_nat_pow, of_rat_pow]
open rat_seq
theorem le_of_le_reprs (x : ) (t : seq) (Ht : regular t) : (∀ n : +, x ≤ t n) →
x ≤ quot.mk (reg_seq.mk t Ht) :=
quot.induction_on x (take s Hs,
show r_le s (reg_seq.mk t Ht), from
have H' : ∀ n : +, r_le s (r_const (t n)), from Hs,
by apply r_le_of_le_reprs; apply Hs)
theorem le_of_reprs_le (x : ) (t : seq) (Ht : regular t) : (∀ n : +, t n ≤ x) →
x ≥ ((quot.mk (reg_seq.mk t Ht)) : ) :=
quot.induction_on x (take s Hs,
show r_le (reg_seq.mk t Ht) s, from
have H' : ∀ n : +, r_le (r_const (t n)) s, from Hs,
by apply r_le_of_reprs_le; apply Hs)
end real