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IMO-Steps / imo_proofs /imo_1982_p1.lean

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	import Mathlib
	set_option linter.unusedVariables.analyzeTactics true


	open Nat

	theorem imo_1982_p1
	(f : ℕ → ℤ)
	(h₀ : ∀ m n, (0 < m ∧ 0 < n) → f (m + n) - f m - f n = 0 ∨ f (m + n) - f m - f n = 1)
	(h₁ : f 2 = 0)
	(h₂ : 0 < f 3)
	(h₃ : f 9999 = 3333) :
	f 1982 = 660 := by
	have h₀₀: ∀ m n, (0 < m ∧ 0 < n) → f m + f n ≤ f (m + n) := by
	intros m n hmn
	have g₀: f (m + n) - f m - f n = 0 ∨ f (m + n) - f m - f n = 1 := by
	exact h₀ m n hmn
	omega
	have h₀₁: ∀ m k, (0 < m ∧ 0 < k) → k * f m ≤ f (k * m) := by
	intros m k hmk
	have g₁: 1 ≤ k := by linarith
	refine Nat.le_induction ?_ ?_ k g₁
	. simp
	. intros n hmn g₂
	rw [cast_add]
	rw [add_mul, add_mul, one_mul]
	simp
	have g₃: f (n * m) + f (m) ≤ f (n * m + m) := by
	refine h₀₀ (n * m) m ?_
	constructor
	. refine mul_pos ?_ hmk.1
	exact hmn
	. exact hmk.1
	refine le_trans ?_ g₃
	exact (Int.add_le_add_iff_right (f m)).mpr g₂
	have h₄: f 3 = 1 := by
	have g₀ : 3333 * f 3 ≤ f (9999) := by
	refine h₀₁ 3 3333 ?_
	omega
	linarith
	have h₅: f 1980 = 660 := by
	have h₅₀: f 1980 ≤ 660 := by
	have g₀ : f (5 * 1980) + f 99 ≤ f (9999) := by
	refine h₀₀ (5 * 1980) 99 (by omega)
	have g₁: 5 * f (1980) ≤ f (5 * 1980) := by
	exact h₀₁ 1980 5 (by omega)
	have g₂: 33 * f 3 ≤ f 99 := by
	exact h₀₁ 3 33 (by omega)
	rw [h₃] at g₀
	linarith
	have h₅₁: 660 ≤ f 1980 := by
	have g₀ : 660 * f 3 ≤ f (1980) := by
	refine h₀₁ 3 660 ?_
	omega
	rw [h₄] at g₀
	exact g₀
	exact le_antisymm h₅₀ h₅₁
	have h₆: f 1982 - f 1980 - f 2 = 0 ∨ f 1982 - f 1980 - f 2 = 1 := by
	refine h₀ 1980 2 ?_
	omega
	cases' h₆ with h₆₀ h₆₁
	. linarith
	. exfalso
	rw [h₅, h₁] at h₆₁
	have h₆₂: f 1982 = 661 := by
	linarith
	have h₆₃: 5 * f 1982 + 29 ≤ 3333 := by
	have g₀ : f (5 * 1982) + f 89 ≤ f 9999 := by
	refine h₀₀ (5 * 1982) 89 (by omega)
	have g₁: f (29 * 3) + f 2 ≤ f 89 := by
	refine h₀₀ (29 * 3) 2 (by omega)
	have g₂: 5 * f (1982) ≤ f (5 * 1982) := by
	exact h₀₁ 1982 5 (by omega)
	have g₃: 29 * f 3 ≤ f (87) := by
	exact h₀₁ 3 29 (by omega)
	linarith
	rw [h₆₂] at h₆₃
	linarith