bookshelf/TheoremProvingInLean/Avigad/Chapter5.lean

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/-
Chapter 5
Tactics
-/
-- ========================================
-- Exercise 1
--
-- Go back to the exercises in Chapter 3 and Chapter 4 and redo as many as you
-- can now with tactic proofs, using also `rw` and `simp` as appropriate.
-- ========================================
namespace ex1
-- ----------------------------------------
-- Exercises 3.1
-- ----------------------------------------
section ex3_1
variable (p q r : Prop)
-- Commutativity of ∧ and
example : p ∧ q ↔ q ∧ p := by
apply Iff.intro
· intro ⟨hp, hq⟩
exact ⟨hq, hp⟩
· intro ⟨hq, hp⟩
exact ⟨hp, hq⟩
example : p q ↔ q p := by
apply Iff.intro
· intro
| Or.inl hp => exact Or.inr hp
| Or.inr hq => exact Or.inl hq
· intro
| Or.inl hq => exact Or.inr hq
| Or.inr hp => exact Or.inl hp
-- Associativity of ∧ and
example : (p ∧ q) ∧ r ↔ p ∧ (q ∧ r) := by
apply Iff.intro
· intro ⟨⟨hp, hq⟩, hr⟩
exact ⟨hp, hq, hr⟩
· intro ⟨hp, hq, hr⟩
exact ⟨⟨hp, hq⟩, hr⟩
example : (p q) r ↔ p (q r) := by
apply Iff.intro
· intro
| Or.inl (Or.inl hp) => exact Or.inl hp
| Or.inl (Or.inr hq) => exact Or.inr (Or.inl hq)
| Or.inr hr => exact Or.inr (Or.inr hr)
· intro
| Or.inl hp => exact Or.inl (Or.inl hp)
| Or.inr (Or.inl hq) => exact Or.inl (Or.inr hq)
| Or.inr (Or.inr hr) => exact Or.inr hr
-- Distributivity
example : p ∧ (q r) ↔ (p ∧ q) (p ∧ r) := by
apply Iff.intro
· intro
| ⟨hp, Or.inl hq⟩ => exact Or.inl ⟨hp, hq⟩
| ⟨hp, Or.inr hr⟩ => exact Or.inr ⟨hp, hr⟩
· intro
| Or.inl ⟨hp, hq⟩ => exact ⟨hp, Or.inl hq⟩
| Or.inr ⟨hp, hr⟩ => exact ⟨hp, Or.inr hr⟩
example : p (q ∧ r) ↔ (p q) ∧ (p r) := by
apply Iff.intro
· intro
| Or.inl hp => exact ⟨Or.inl hp, Or.inl hp⟩
| Or.inr ⟨hq, hr⟩ => exact ⟨Or.inr hq, Or.inr hr⟩
· intro
| ⟨Or.inl hp, _⟩ => exact Or.inl hp
| ⟨Or.inr _, Or.inl hp⟩ => exact Or.inl hp
| ⟨Or.inr hq, Or.inr hr⟩ => exact Or.inr ⟨hq, hr⟩
-- Other properties
example : (p → (q → r)) ↔ (p ∧ q → r) := by
apply Iff.intro
· intro h ⟨hp, hq⟩
exact h hp hq
· intro h hp hq
exact h ⟨hp, hq⟩
example : ((p q) → r) ↔ (p → r) ∧ (q → r) := by
apply Iff.intro
· intro h
apply And.intro
· intro hp
exact h (Or.inl hp)
· intro hq
exact h (Or.inr hq)
· intro ⟨hpr, hqr⟩ h
apply Or.elim h
· intro hp
exact hpr hp
· intro hq
exact hqr hq
example : ¬(p q) ↔ ¬p ∧ ¬q := by
apply Iff.intro
· intro h
apply And.intro
· intro hp
exact h (Or.inl hp)
· intro hq
exact h (Or.inr hq)
· intro ⟨np, nq⟩
intro
| Or.inl hp => exact absurd hp np
| Or.inr hq => exact absurd hq nq
example : ¬p ¬q → ¬(p ∧ q) := by
intro
| Or.inl np => intro h; exact absurd h.left np
| Or.inr nq => intro h; exact absurd h.right nq
example : ¬(p ∧ ¬p) := by
intro ⟨hp, np⟩
exact absurd hp np
example : p ∧ ¬q → ¬(p → q) := by
intro ⟨hp, nq⟩ h
exact absurd (h hp) nq
example : ¬p → (p → q) := by
intro np hp
exact absurd hp np
example : (¬p q) → (p → q) := by
intro
| Or.inl np => intro hp; exact absurd hp np
| Or.inr hq => exact fun _ => hq
example : p False ↔ p := by
apply Iff.intro
· intro
| Or.inl hp => exact hp
| Or.inr ff => exact False.elim ff
· intro hp
exact Or.inl hp
example : p ∧ False ↔ False := by
apply Iff.intro
· intro ⟨_, ff⟩
exact ff
· intro ff
exact False.elim ff
example : (p → q) → (¬q → ¬p) := by
intro hpq nq hp
exact absurd (hpq hp) nq
end ex3_1
-- ----------------------------------------
-- Exercises 3.2
-- ----------------------------------------
section ex3_2
open Classical
variable (p q r s : Prop)
example (hp : p) : (p → r s) → ((p → r) (p → s)) := by
intro h
apply (h hp).elim
· intro hr
exact Or.inl (fun _ => hr)
· intro hs
exact Or.inr (fun _ => hs)
example : ¬(p ∧ q) → ¬p ¬q := by
intro h
apply (em p).elim
· intro hp
apply (em q).elim
· intro hq
exact False.elim (h ⟨hp, hq⟩)
· intro nq
exact Or.inr nq
· intro np
exact Or.inl np
example : ¬(p → q) → p ∧ ¬q := by
intro h
apply And.intro
· apply byContradiction
intro np
apply h
intro hp
exact absurd hp np
· intro hq
apply h
intro _
exact hq
example : (p → q) → (¬p q) := by
intro hpq
apply (em p).elim
· intro hp
exact Or.inr (hpq hp)
· intro np
exact Or.inl np
example : (¬q → ¬p) → (p → q) := by
intro hqp hp
apply byContradiction
intro nq
exact absurd hp (hqp nq)
example : p ¬p := by apply em
example : (((p → q) → p) → p) := by
intro h
apply (em p).elim
· intro hp
exact hp
· intro np
apply h
intro hp
exact absurd hp np
end ex3_2
-- ----------------------------------------
-- Exercises 3.3
-- ----------------------------------------
section ex3_3
variable (p : Prop)
example (hp : p) : ¬(p ↔ ¬p) := by
intro h
exact absurd hp (h.mp hp)
end ex3_3
-- ----------------------------------------
-- Exercises 4.1
-- ----------------------------------------
section ex4_1
variable (α : Type _)
variable (p q : α → Prop)
example : (∀ x, p x ∧ q x) ↔ (∀ x, p x) ∧ (∀ x, q x) := by
apply Iff.intro
· intro h
apply And.intro
· intro hx; exact And.left (h hx)
· intro hx; exact And.right (h hx)
· intro h hx
have lhs : ∀ (x : α), p x := And.left h
have rhs : ∀ (x : α), q x := And.right h
exact ⟨lhs hx, rhs hx⟩
example : (∀ x, p x → q x) → (∀ x, p x) → (∀ x, q x) := by
intro h₁ h₂ hx
exact h₁ hx (h₂ hx)
example : (∀ x, p x) (∀ x, q x) → ∀ x, p x q x := by
intro
| Or.inl h => intro hx; exact Or.inl (h hx)
| Or.inr h => intro hx; exact Or.inr (h hx)
end ex4_1
-- ----------------------------------------
-- Exercises 4.2
-- ----------------------------------------
section ex4_2
variable (α : Type _)
variable (p q : α → Prop)
variable (r : Prop)
example : α → ((∀ _ : α, r) ↔ r) := by
intro ha
apply Iff.intro
· intro har
apply har
exact ha
· intro hr _
exact hr
section
open Classical
example : (∀ x, p x r) ↔ (∀ x, p x) r := by
apply Iff.intro
· intro h
apply (em r).elim
· intro hr
exact Or.inr hr
· intro nr
apply Or.inl
· intro hx
apply (h hx).elim
· exact id
· intro hr
exact absurd hr nr
· intro h₁ hx
apply h₁.elim
· intro h₂
exact Or.inl (h₂ hx)
· intro hr
exact Or.inr hr
end
example : (∀ x, r → p x) ↔ (r → ∀ x, p x) := by
apply Iff.intro
· intro h hr hx
exact h hx hr
· intro h hx hr
exact h hr hx
end ex4_2
-- ----------------------------------------
-- Exercises 4.3
-- ----------------------------------------
section ex4_3
open Classical
variable (men : Type _)
variable (barber : men)
variable (shaves : men → men → Prop)
example (h : ∀ x : men, shaves barber x ↔ ¬ shaves x x) : False := by
apply (em (shaves barber barber)).elim
· intro hb
exact absurd hb ((h barber).mp hb)
· intro nb
exact absurd ((h barber).mpr nb) nb
end ex4_3
-- ----------------------------------------
-- Exercises 4.5
-- ----------------------------------------
section ex4_5
open Classical
variable (α : Type _)
variable (p q : α → Prop)
variable (r s : Prop)
example : (∃ _ : α, r) → r := by
intro ⟨_, hr⟩
exact hr
example (a : α) : r → (∃ _ : α, r) := by
intro hr
exact ⟨a, hr⟩
example : (∃ x, p x ∧ r) ↔ (∃ x, p x) ∧ r := by
apply Iff.intro
· intro ⟨hx, hp, hr⟩
exact ⟨⟨hx, hp⟩, hr⟩
· intro ⟨⟨hx, hp⟩, hr⟩
exact ⟨hx, hp, hr⟩
example : (∃ x, p x q x) ↔ (∃ x, p x) (∃ x, q x) := by
apply Iff.intro
· intro
| ⟨hx, Or.inl hp⟩ => exact Or.inl ⟨hx, hp⟩
| ⟨hx, Or.inr hq⟩ => exact Or.inr ⟨hx, hq⟩
· intro
| Or.inl ⟨hx, hp⟩ => exact ⟨hx, Or.inl hp⟩
| Or.inr ⟨hx, hq⟩ => exact ⟨hx, Or.inr hq⟩
example : (∀ x, p x) ↔ ¬(∃ x, ¬p x) := by
apply Iff.intro
· intro ha ⟨hx, np⟩
exact absurd (ha hx) np
· intro he hx
apply byContradiction
intro np
exact he ⟨hx, np⟩
example : (∃ x, p x) ↔ ¬(∀ x, ¬p x) := by
apply Iff.intro
· intro ⟨hx, hp⟩ h
exact absurd hp (h hx)
· intro h₁
apply byContradiction
intro h₂
apply h₁
intro hx hp
exact h₂ ⟨hx, hp⟩
example : (¬∃ x, p x) ↔ (∀ x, ¬p x) := by
apply Iff.intro
· intro h hx hp
exact h ⟨hx, hp⟩
· intro h ⟨hx, hp⟩
exact absurd hp (h hx)
theorem forall_negation : (¬∀ x, p x) ↔ (∃ x, ¬p x) := by
apply Iff.intro
· intro h₁
apply byContradiction
intro h₂
exact h₁ (fun (x : α) => by
apply byContradiction
intro np
exact h₂ ⟨x, np⟩)
· intro ⟨hx, np⟩ h
exact absurd (h hx) np
example : (¬∀ x, p x) ↔ (∃ x, ¬p x) := forall_negation α p
example : (∀ x, p x → r) ↔ (∃ x, p x) → r := by
apply Iff.intro
· intro h ⟨hx, hp⟩
exact h hx hp
· intro h hx hp
exact h ⟨hx, hp⟩
example (a : α) : (∃ x, p x → r) ↔ (∀ x, p x) → r := by
apply Iff.intro
· intro ⟨hx, hp⟩ h
apply hp
exact h hx
· intro h₁
apply (em (∀ x, p x)).elim
· intro h₂
exact ⟨a, fun _ => h₁ h₂⟩
· intro h₂
have ⟨hx, np⟩ : (∃ x, ¬p x) := (forall_negation α p).mp h₂
exact ⟨hx, fun hp => absurd hp np⟩
example (a : α) : (∃ x, r → p x) ↔ (r → ∃ x, p x) := by
apply Iff.intro
· intro ⟨hx, h⟩ hr
exact ⟨hx, h hr⟩
· intro h
apply (em r).elim
· intro hr
have ⟨hx, hp⟩ := h hr
exact ⟨hx, fun _ => hp⟩
· intro nr
exact ⟨a, fun hr => absurd hr nr⟩
end ex4_5
end ex1
-- ========================================
-- Exercise 2
--
-- Use tactic combinators to obtain a one line proof of the following:
-- ========================================
namespace ex2
example (p q r : Prop) (hp : p) : (p q r) ∧ (q p r) ∧ (q r p) :=
by simp [*]
end ex2