bookshelf/one-variable-calculus/Apostol/Chapter_I_3.lean

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/-
Chapter I 3
A Set of Axioms for the Real-Number System
-/
import Bookshelf.Real.Set
#check Archimedean
#check Real.exists_isLUB
namespace Real
-- ========================================
-- The least-upper-bound axiom (completeness axiom)
-- ========================================
/--
A property holds for the negation of elements in set `S` if and only if it also
holds for the elements of the negation of `S`.
-/
lemma set_neg_prop_iff_neg_set_prop (S : Set ) (p : → Prop)
: (∀ y, y ∈ S → p (-y)) ↔ (∀ y, y ∈ -S → p y) := by
apply Iff.intro
· intro h y hy
rw [← neg_neg y, Set.neg_mem_neg] at hy
have := h (-y) hy
simp at this
exact this
· intro h y hy
rw [← Set.neg_mem_neg] at hy
exact h (-y) hy
/--
The upper bounds of the negation of a set is the negation of the lower bounds of
the set.
-/
lemma upper_bounds_neg_eq_neg_lower_bounds (S : Set )
: upperBounds (-S) = -lowerBounds S := by
suffices (∀ x, x ∈ upperBounds (-S) ↔ x ∈ -(lowerBounds S)) from
Set.ext this
intro x
apply Iff.intro
· intro hx
unfold lowerBounds
show -x ∈ { x | ∀ ⦃a : ℝ⦄, a ∈ S → x ≤ a }
show ∀ ⦃a : ℝ⦄, a ∈ S → (-x) ≤ a
intro a ha; rw [neg_le]; revert ha a
rw [set_neg_prop_iff_neg_set_prop S (fun a => a ≤ x)]
exact hx
· intro hx
unfold upperBounds
show ∀ ⦃a : ℝ⦄, a ∈ -S → a ≤ x
rw [← set_neg_prop_iff_neg_set_prop S (fun a => a ≤ x)]
intro y hy; rw [neg_le]; revert hy y
exact hx
/--
The negation of the upper bounds of a set is the lower bounds of the negation of
the set.
-/
lemma neg_upper_bounds_eq_lower_bounds_neg (S : Set )
: -upperBounds S = lowerBounds (-S) := by
suffices (∀ x, x ∈ -upperBounds S ↔ x ∈ lowerBounds (-S)) from
Set.ext this
intro x
apply Iff.intro
· intro hx
unfold lowerBounds
show ∀ ⦃a : ℝ⦄, a ∈ -S → x ≤ a
rw [← set_neg_prop_iff_neg_set_prop S (fun a => x ≤ a)]
intro y hy; rw [le_neg]; revert hy y
exact hx
· intro hx
unfold upperBounds
show -x ∈ { x | ∀ ⦃a : ℝ⦄, a ∈ S → a ≤ x }
show ∀ ⦃a : ℝ⦄, a ∈ S → a ≤ (-x)
intro a ha; rw [le_neg]; revert ha a
rw [set_neg_prop_iff_neg_set_prop S (fun a => x ≤ a)]
exact hx
/--
An element `x` is the least element of the negation of a set if and only if `-x`
if the greatest element of the set.
-/
lemma is_least_neg_set_eq_is_greatest_set_neq (S : Set )
: IsLeast (-S) x = IsGreatest S (-x) := by
unfold IsLeast IsGreatest
rw [← neg_upper_bounds_eq_lower_bounds_neg S]
rfl
/--
At least with respect to ``, `x` is the least upper bound of set `-S` if and
only if `-x` is the greatest lower bound of `S`.
-/
theorem is_lub_neg_set_iff_is_glb_set_neg (S : Set )
: IsLUB (-S) x = IsGLB S (-x) :=
calc IsLUB (-S) x
_ = IsLeast (upperBounds (-S)) x := rfl
_ = IsLeast (-lowerBounds S) x := by rw [upper_bounds_neg_eq_neg_lower_bounds S]
_ = IsGreatest (lowerBounds S) (-x) := by rw [is_least_neg_set_eq_is_greatest_set_neq]
_ = IsGLB S (-x) := rfl
/--
Theorem I.27
Every nonempty set `S` that is bounded below has a greatest lower bound; that
is, there is a real number `L` such that `L = inf S`.
-/
theorem exists_isGLB (S : Set ) (hne : S.Nonempty) (hbdd : BddBelow S)
: ∃ x, IsGLB S x := by
-- First we show the negation of a nonempty set bounded below is a nonempty
-- set bounded above. In that case, we can then apply the completeness axiom
-- to argue the existence of a supremum.
have hne' : (-S).Nonempty := Set.nonempty_neg.mpr hne
have hbdd' : ∃ x, ∀ (y : ), y ∈ -S → y ≤ x := by
rw [bddBelow_def] at hbdd
let ⟨lb, lbp⟩ := hbdd
refine ⟨-lb, ?_⟩
rw [← set_neg_prop_iff_neg_set_prop S (fun y => y ≤ -lb)]
intro y hy
exact neg_le_neg (lbp y hy)
rw [←bddAbove_def] at hbdd'
-- Once we have found a supremum for `-S`, we argue the negation of this value
-- is the same as the infimum of `S`.
let ⟨ub, ubp⟩ := exists_isLUB (-S) hne' hbdd'
exact ⟨-ub, (is_lub_neg_set_iff_is_glb_set_neg S).mp ubp⟩
/--
Every real should be less than or equal to the absolute value of its ceiling.
-/
lemma leq_nat_abs_ceil_self (x : ) : x ≤ Int.natAbs ⌈x⌉ := by
by_cases h : x ≥ 0
· let k : := ⌈x⌉
unfold Int.natAbs
have k' : k = ⌈x⌉ := rfl
rw [←k']
have _ : k ≥ 0 := by -- Hint for match below
rw [k', ge_iff_le]
exact Int.ceil_nonneg (ge_iff_le.mp h)
match k with
| Int.ofNat m => calc x
_ ≤ ⌈x⌉ := Int.le_ceil x
_ = Int.ofNat m := by rw [←k']
· have h' : ((Int.natAbs ⌈x⌉) : ) ≥ 0 := by simp
calc x
_ ≤ 0 := le_of_lt (lt_of_not_le h)
_ ≤ ↑(Int.natAbs ⌈x⌉) := GE.ge.le h'
-- ========================================
-- The Archimedean property of the real-number system
-- ========================================
/--
Theorem I.29
For every real `x` there exists a positive integer `n` such that `n > x`.
-/
theorem exists_pnat_geq_self (x : ) : ∃ n : +, ↑n > x := by
let x' : + := ⟨Int.natAbs ⌈x⌉ + 1, by simp⟩
have h : x < x' := calc x
_ ≤ Int.natAbs ⌈x⌉ := leq_nat_abs_ceil_self x
_ < ↑↑(Int.natAbs ⌈x⌉ + 1) := by simp
_ = x' := rfl
exact ⟨x', h⟩
/--
Theorem I.30
If `x > 0` and if `y` is an arbitrary real number, there exists a positive
integer `n` such that `nx > y`.
This is known as the *Archimedean Property of the Reals*.
-/
theorem exists_pnat_mul_self_geq_of_pos {x y : }
: x > 0 → ∃ n : +, n * x > y := by
intro hx
let ⟨n, p⟩ := exists_pnat_geq_self (y / x)
have p' := mul_lt_mul_of_pos_right p hx
rw [div_mul, div_self (show x ≠ 0 from LT.lt.ne' hx), div_one] at p'
exact ⟨n, p'⟩
/--
Theorem I.31
If three real numbers `a`, `x`, and `y` satisfy the inequalities
`a ≤ x ≤ a + y / n` for every integer `n ≥ 1`, then `x = a`.
-/
theorem forall_pnat_leq_self_leq_frac_imp_eq {x y a : }
: (∀ n : +, a ≤ x ∧ x ≤ a + (y / n)) → x = a := by
intro h
match @trichotomous LT.lt _ x a with
| Or.inr (Or.inl r) => -- x = a
exact r
| Or.inl r => -- x < a
have z : a < a := lt_of_le_of_lt (h 1).left r
simp at z
| Or.inr (Or.inr r) => -- x > a
let ⟨c, hc⟩ := exists_pos_add_of_lt' r
let ⟨n, hn⟩ := @exists_pnat_mul_self_geq_of_pos c y hc.left
have hn := mul_lt_mul_of_pos_left hn $
have hp : 0 < (↑↑n : ) := by simp
show 0 < ((↑↑n)⁻¹ : ) from inv_pos.mpr hp
rw [
inv_mul_eq_div,
← mul_assoc, mul_comm (n⁻¹ : ),
← one_div,
mul_one_div
] at hn
simp at hn
have := calc a + y / ↑↑n
_ < a + c := add_lt_add_left hn a
_ = x := hc.right
_ ≤ a + y / ↑↑n := (h n).right
simp at this
/--
If three real numbers `a`, `x`, and `y` satisfy the inequalities
`a - y / n ≤ x ≤ a` for every integer `n ≥ 1`, then `x = a`.
-/
theorem forall_pnat_frac_leq_self_leq_imp_eq {x y a : }
: (∀ n : +, a - (y / n) ≤ x ∧ x ≤ a) → x = a := by
intro h
match @trichotomous LT.lt _ x a with
| Or.inr (Or.inl r) => -- x = a
exact r
| Or.inl r => -- x < a
let ⟨c, hc⟩ := exists_pos_add_of_lt' r
let ⟨n, hn⟩ := @exists_pnat_mul_self_geq_of_pos c y hc.left
have hn := mul_lt_mul_of_pos_left hn $
have hp : 0 < (↑↑n : ) := by simp
show 0 < ((↑↑n)⁻¹ : ) from inv_pos.mpr hp
rw [
inv_mul_eq_div,
← mul_assoc, mul_comm (n⁻¹ : ),
← one_div,
mul_one_div
] at hn
simp at hn
have := calc a - y / ↑↑n
_ > a - c := sub_lt_sub_left hn a
_ = x := sub_eq_of_eq_add (Eq.symm hc.right)
_ ≥ a - y / ↑↑n := (h n).left
simp at this
| Or.inr (Or.inr r) => -- x > a
have z : x < x := lt_of_le_of_lt (h 1).right r
simp at z
-- ========================================
-- Fundamental properties of the supremum and infimum
-- ========================================
/--
Every member of a set `S` is less than or equal to some value `ub` if and only
if `ub` is an upper bound of `S`.
-/
lemma mem_upper_bounds_iff_forall_le {S : Set }
: ub ∈ upperBounds S ↔ ∀ x ∈ S, x ≤ ub := by
apply Iff.intro
· intro h _ hx
exact (h hx)
· exact id
/--
If a set `S` has a least upper bound, it follows every member of `S` is less
than or equal to that value.
-/
lemma forall_lub_imp_forall_le {S : Set }
: IsLUB S ub → ∀ x ∈ S, x ≤ ub := by
intro h
rw [← mem_upper_bounds_iff_forall_le]
exact h.left
/--
Any member of the upper bounds of a set must be greater than or equal to the
least member of that set.
-/
lemma mem_imp_ge_lub {x : } (h : IsLUB S s) : x ∈ upperBounds S → x ≥ s := by
intro hx
exact h.right hx
/--
Theorem I.32a
Let `h` be a given positive number and let `S` be a set of real numbers. If `S`
has a supremum, then for some `x` in `S` we have `x > sup S - h`.
-/
theorem sup_imp_exists_gt_sup_sub_delta {S : Set } {s h : } (hp : h > 0)
: IsLUB S s → ∃ x ∈ S, x > s - h := by
intro hb
-- Suppose all members of our set was less than `s - h`. Then `s` couldn't be
-- the *least* upper bound.
by_contra nb
suffices s - h ∈ upperBounds S by
have h' : h < h := calc h
_ ≤ 0 := (le_sub_self_iff s).mp (hb.right this)
_ < h := hp
simp at h'
rw [not_exists] at nb
have nb' : ∀ x ∈ S, x ≤ s - h := by
intro x hx
exact le_of_not_gt (not_and.mp (nb x) hx)
rwa [← mem_upper_bounds_iff_forall_le] at nb'
/--
Every member of a set `S` is greater than or equal to some value `lb` if and
only if `lb` is a lower bound of `S`.
-/
lemma mem_lower_bounds_iff_forall_ge {S : Set }
: lb ∈ lowerBounds S ↔ ∀ x ∈ S, x ≥ lb := by
apply Iff.intro
· intro h _ hx
exact (h hx)
· exact id
/--
If a set `S` has a greatest lower bound, it follows every member of `S` is
greater than or equal to that value.
-/
lemma forall_glb_imp_forall_ge {S : Set }
: IsGLB S lb → ∀ x ∈ S, x ≥ lb := by
intro h
rw [← mem_lower_bounds_iff_forall_ge]
exact h.left
/--
Any member of the lower bounds of a set must be less than or equal to the
greatest member of that set.
-/
lemma mem_imp_le_glb {x : } (h : IsGLB S s) : x ∈ lowerBounds S → x ≤ s := by
intro hx
exact h.right hx
/--
Theorem I.32b
Let `h` be a given positive number and let `S` be a set of real numbers. If `S`
has an infimum, then for some `x` in `S` we have `x < inf S + h`.
-/
theorem inf_imp_exists_lt_inf_add_delta {S : Set } {s h : } (hp : h > 0)
: IsGLB S s → ∃ x ∈ S, x < s + h := by
intro hb
-- Suppose all members of our set was greater than `s + h`. Then `s` couldn't
-- be the *greatest* lower bound.
by_contra nb
suffices s + h ∈ lowerBounds S by
have h' : h < h := calc h
_ ≤ 0 := (add_le_iff_nonpos_right s).mp (hb.right this)
_ < h := hp
simp at h'
rw [not_exists] at nb
have nb' : ∀ x ∈ S, x ≥ s + h := by
intro x hx
exact le_of_not_gt (not_and.mp (nb x) hx)
rwa [← mem_lower_bounds_iff_forall_ge] at nb'
/--
Theorem I.33a (Additive Property)
Given nonempty subsets `A` and `B` of ``, let `C` denote the set
`C = {a + b : a ∈ A, b ∈ B}`. If each of `A` and `B` has a supremum, then `C`
has a supremum, and `sup C = sup A + sup B`.
-/
theorem sup_minkowski_sum_eq_sup_add_sup (A B : Set ) (a b : )
(hA : A.Nonempty) (hB : B.Nonempty)
(ha : IsLUB A a) (hb : IsLUB B b)
: IsLUB (Real.minkowski_sum A B) (a + b) := by
let C := Real.minkowski_sum A B
-- First we show `a + b` is an upper bound of `C`.
have hub : a + b ∈ upperBounds C := by
rw [mem_upper_bounds_iff_forall_le]
intro x hx
have ⟨a', ⟨ha', ⟨b', ⟨hb', hxab⟩⟩⟩⟩: ∃ a ∈ A, ∃ b ∈ B, x = a + b := hx
have hs₁ : a' ≤ a := (forall_lub_imp_forall_le ha) a' ha'
have hs₂ : b' ≤ b := (forall_lub_imp_forall_le hb) b' hb'
exact calc x
_ = a' + b' := hxab
_ ≤ a + b := add_le_add hs₁ hs₂
-- Now we show `a + b` is the *least* upper bound of `C`. We know a least
-- upper bound `c` exists; show that `c = a + b`.
have ⟨c, hc⟩ := exists_isLUB C
(Real.nonempty_minkowski_sum_iff_nonempty_add_nonempty.mpr ⟨hA, hB⟩)
⟨a + b, hub⟩
suffices (∀ n : +, c ≤ a + b ∧ a + b ≤ c + (1 / n)) by
rwa [← forall_pnat_leq_self_leq_frac_imp_eq this] at hc
intro n
apply And.intro
· exact hc.right hub
· have hd : 1 / (2 * n) > (0 : ) := by norm_num
have ⟨a', ha'⟩ := sup_imp_exists_gt_sup_sub_delta hd ha
have ⟨b', hb'⟩ := sup_imp_exists_gt_sup_sub_delta hd hb
have hab' : a + b < a' + b' + 1 / n := by
have ha'' := add_lt_add_right ha'.right (1 / (2 * ↑↑n))
have hb'' := add_lt_add_right hb'.right (1 / (2 * ↑↑n))
rw [sub_add_cancel] at ha'' hb''
have hr := add_lt_add ha'' hb''
ring_nf at hr
ring_nf
rwa [add_assoc, add_comm b' (↑↑n)⁻¹, ← add_assoc]
have hc' : a' + b' ≤ c := by
refine forall_lub_imp_forall_le hc (a' + b') ?_
show ∃ a ∈ A, ∃ b ∈ B, a' + b' = a + b
exact ⟨a', ⟨ha'.left, ⟨b', ⟨hb'.left, rfl⟩⟩⟩⟩
calc a + b
_ ≤ a' + b' + 1 / n := le_of_lt hab'
_ ≤ c + 1 / n := add_le_add_right hc' (1 / n)
/--
Theorem I.33b (Additive Property)
Given nonempty subsets `A` and `B` of ``, let `C` denote the set
`C = {a + b : a ∈ A, b ∈ B}`. If each of `A` and `B` has an infimum, then `C`
has an infimum, and `inf C = inf A + inf B`.
-/
theorem inf_minkowski_sum_eq_inf_add_inf (A B : Set )
(hA : A.Nonempty) (hB : B.Nonempty)
(ha : IsGLB A a) (hb : IsGLB B b)
: IsGLB (Real.minkowski_sum A B) (a + b) := by
let C := Real.minkowski_sum A B
-- First we show `a + b` is a lower bound of `C`.
have hlb : a + b ∈ lowerBounds C := by
rw [mem_lower_bounds_iff_forall_ge]
intro x hx
have ⟨a', ⟨ha', ⟨b', ⟨hb', hxab⟩⟩⟩⟩: ∃ a ∈ A, ∃ b ∈ B, x = a + b := hx
have hs₁ : a' ≥ a := (forall_glb_imp_forall_ge ha) a' ha'
have hs₂ : b' ≥ b := (forall_glb_imp_forall_ge hb) b' hb'
exact calc x
_ = a' + b' := hxab
_ ≥ a + b := add_le_add hs₁ hs₂
-- Now we show `a + b` is the *greatest* lower bound of `C`. We know a
-- greatest lower bound `c` exists; show that `c = a + b`.
have ⟨c, hc⟩ := exists_isGLB C
(Real.nonempty_minkowski_sum_iff_nonempty_add_nonempty.mpr ⟨hA, hB⟩)
⟨a + b, hlb⟩
suffices (∀ n : +, c - (1 / n) ≤ a + b ∧ a + b ≤ c) by
rwa [← forall_pnat_frac_leq_self_leq_imp_eq this] at hc
intro n
apply And.intro
· have hd : 1 / (2 * n) > (0 : ) := by norm_num
have ⟨a', ha'⟩ := inf_imp_exists_lt_inf_add_delta hd ha
have ⟨b', hb'⟩ := inf_imp_exists_lt_inf_add_delta hd hb
have hab' : a' + b' - 1 / n < a + b := by
have ha'' := sub_lt_sub_right ha'.right (1 / (2 * ↑↑n))
have hb'' := sub_lt_sub_right hb'.right (1 / (2 * ↑↑n))
rw [add_sub_cancel] at ha'' hb''
have hr := add_lt_add ha'' hb''
ring_nf at hr
ring_nf
rwa [← add_sub_assoc, add_sub_right_comm]
have hc' : c ≤ a' + b' := by
refine forall_glb_imp_forall_ge hc (a' + b') ?_
show ∃ a ∈ A, ∃ b ∈ B, a' + b' = a + b
exact ⟨a', ⟨ha'.left, ⟨b', ⟨hb'.left, rfl⟩⟩⟩⟩
calc c - 1 / n
_ ≤ a' + b' - 1 / n := sub_le_sub_right hc' (1 / n)
_ ≤ a + b := le_of_lt hab'
· exact hc.right hlb
/--
Theorem I.34
Given two nonempty subsets `S` and `T` of `` such that `s ≤ t` for every `s` in
`S` and every `t` in `T`. Then `S` has a supremum, and `T` has an infimum, and
they satisfy the inequality `sup S ≤ inf T`.
-/
theorem forall_mem_le_forall_mem_imp_sup_le_inf (S T : Set )
(hS : S.Nonempty) (hT : T.Nonempty)
(p : ∀ s ∈ S, ∀ t ∈ T, s ≤ t)
: ∃ (s : ), IsLUB S s ∧ ∃ (t : ), IsGLB T t ∧ s ≤ t := by
-- Sshow a supremum of `S` and an infimum of `T` exists (since each set bounds
-- above and below the other, respectively).
let ⟨s, hs⟩ := hS
let ⟨t, ht⟩ := hT
have ps : t ∈ upperBounds S := by
intro x hx
exact p x hx t ht
have pt : s ∈ lowerBounds T := by
intro x hx
exact p s hs x hx
have ⟨S_lub, hS_lub⟩ := Real.exists_isLUB S hS ⟨t, ps⟩
have ⟨T_glb, hT_glb⟩ := Real.exists_isGLB T hT ⟨s, pt⟩
refine ⟨S_lub, ⟨hS_lub, ⟨T_glb, ⟨hT_glb, ?_⟩⟩⟩⟩
-- Assume `T_glb < S_lub`. Then `∃ c, T_glb + c < S_lub` which in turn implies
-- existence of some `x ∈ S` such that `T_glb < S_lub - c / 2 < x < S_lub`.
by_contra nr
rw [not_le] at nr
have ⟨c, hc⟩ := exists_pos_add_of_lt' nr
have c_div_two_gt_zero : c / 2 > 0 := by
have hr := div_lt_div_of_lt (show (0 : ) < 2 by simp) hc.left
rwa [zero_div] at hr
have T_glb_lt_S_lub_sub_c_div_two : T_glb < S_lub - c / 2 := by
have hr := congrFun (congrArg HSub.hSub hc.right) (c / 2)
rw [add_sub_assoc, sub_half c] at hr
calc T_glb
_ < T_glb + c / 2 := (lt_add_iff_pos_right T_glb).mpr c_div_two_gt_zero
_ = S_lub - c / 2 := hr
-- Since `x ∈ S`, `p` implies `x ≤ t` for all `t ∈ T`. So `x ≤ T_glb`. But the
-- above implies `T_glb < x`.
have ⟨x, hx⟩ := sup_imp_exists_gt_sup_sub_delta c_div_two_gt_zero hS_lub
have : x < x := calc x
_ ≤ T_glb := mem_imp_le_glb hT_glb (p x hx.left)
_ < S_lub - c / 2 := T_glb_lt_S_lub_sub_c_div_two
_ < x := hx.right
simp at this
end Real