import Mathlib set_option linter.unusedVariables.analyzeTactics true open Real lemma imo_1964_p2_1 (a b c : ℝ) (ha : 0 < -a + b + c) (hb : 0 < a - b + c) (hc : 0 < a + b - c) (g1 : (a + b - c) * (a - b + c) * (-a + b + c) ≤ a * b * c) : ((a + b - c) * (a - b + c) * (-a + b + c)) ^ 2 ≤ (a * b * c) ^ 2 := by refine pow_le_pow_left₀ (le_of_lt ?_) g1 2 exact mul_pos (mul_pos hc hb) ha lemma imo_1964_p2_2 (a b c : ℝ) : (a + b - c) * (a + c - b) ≤ a ^ 2 := by have h₁: (a + b - c) * (a + c - b) = a ^ 2 - (b - c) ^ 2 := by linarith rw [h₁] refine sub_le_self _ ?_ exact sq_nonneg (b - c) lemma imo_1964_p2_3 (a b c : ℝ) : a ^ 2 - (b - c) ^ 2 ≤ a ^ 2 := by simp exact sq_nonneg (b - c) lemma imo_1964_p2_4 (a b c : ℝ) (h₀ : 0 < a ∧ 0 < b ∧ 0 < c) (h₁ : c < a + b) (h₂ : b < a + c) (h₃ : a < b + c) : ((a + b - c) * (a + c - b) * (b + c - a)) ^ 2 ≤ (a * b * c) ^ 2 := by have ha : 0 < b + c - a := by exact sub_pos.mpr h₃ have hb : 0 < a + c - b := by exact sub_pos.mpr h₂ have hc : 0 < a + b - c := by exact sub_pos.mpr h₁ have h₄₁: (a + b - c) * (a + c - b) ≤ a ^ 2 := by exact imo_1964_p2_2 a b c have h₄₂: (a + b - c) * (b + c - a) ≤ b ^ 2 := by rw [add_comm a b] exact imo_1964_p2_2 b a c have h₄₃: (a + c - b) * (b + c - a) ≤ c ^ 2 := by rw [add_comm a c, add_comm b c] exact imo_1964_p2_2 c a b have h₄₄: ((a + b - c) * (a + c - b) * (b + c - a)) ^ 2 = ((a + b - c) * (a + c - b)) * ((a + b - c) * (b + c - a)) * ((a + c - b) * (b + c - a)) := by linarith rw [h₄₄] repeat rw [mul_pow] refine mul_le_mul ?_ h₄₃ ?_ ?_ . refine mul_le_mul h₄₁ h₄₂ ?_ ?_ . refine le_of_lt ?_ exact mul_pos hc ha . exact sq_nonneg a . refine le_of_lt ?_ exact mul_pos hb ha . refine le_of_lt ?_ simp_all only [sub_pos, gt_iff_lt, pow_pos, mul_pos_iff_of_pos_left] lemma imo_1964_p2_5 (a b c : ℝ) -- (h₀ : 0 < a ∧ 0 < b ∧ 0 < c) -- (h₁ : c < a + b) -- (h₂ : b < a + c) -- (h₃ : a < b + c) (ha : 0 < b + c - a) (hb : 0 < a + c - b) (hc : 0 < a + b - c) (h₄₁ : (a + b - c) * (a + c - b) ≤ a ^ 2) (h₄₂ : (a + b - c) * (b + c - a) ≤ b ^ 2) (h₄₃ : (a + c - b) * (b + c - a) ≤ c ^ 2) : ((a + b - c) * (a + c - b) * (b + c - a)) ^ 2 ≤ (a * b * c) ^ 2 := by repeat rw [mul_pow] rw [pow_two, pow_two, pow_two] have h₅: ((a + b - c) * (a + c - b)) * ((a + b - c) * (b + c - a)) ≤ a ^ 2 * b ^ 2 := by refine mul_le_mul h₄₁ h₄₂ ?_ ?_ . refine le_of_lt ?_ exact mul_pos hc ha . exact sq_nonneg a have h₆: ((a + b - c) * (a + c - b)) * ((a + b - c) * (b + c - a)) * ((a + c - b) * (b + c - a)) ≤ a ^ 2 * b ^ 2 * c ^ 2 := by refine mul_le_mul h₅ h₄₃ ?_ ?_ . refine le_of_lt ?_ exact mul_pos hb ha . refine mul_nonneg ?_ ?_ . exact sq_nonneg a . exact sq_nonneg b linarith lemma imo_1964_p2_6 (a b c : ℝ) -- (h₀ : 0 < a ∧ 0 < b ∧ 0 < c) -- h₁ : c < a + b -- h₂ : b < a + c -- h₃ : a < b + c (ha : 0 < b + c - a) (hb : 0 < a + c - b) (hc : 0 < a + b - c) (h₄₁ : (a + b - c) * (a + c - b) ≤ a ^ 2) (h₄₂ : (a + b - c) * (b + c - a) ≤ b ^ 2) (h₄₃ : (a + c - b) * (b + c - a) ≤ c ^ 2) (h₄₄ : ((a + b - c) * (a + c - b) * (b + c - a)) ^ 2 = (a + b - c) * (a + c - b) * ((a + b - c) * (b + c - a)) * ((a + c - b) * (b + c - a))) : ((a + b - c) * (a + c - b) * (b + c - a)) ^ 2 ≤ a ^ 2 * b ^ 2 * c ^ 2 := by rw [h₄₄] have h₅: ((a + b - c) * (a + c - b)) * ((a + b - c) * (b + c - a)) ≤ a ^ 2 * b ^ 2 := by refine mul_le_mul h₄₁ h₄₂ ?_ ?_ . refine le_of_lt ?_ exact mul_pos hc ha . exact sq_nonneg a have h₆: ((a + b - c) * (a + c - b)) * ((a + b - c) * (b + c - a)) * ((a + c - b) * (b + c - a)) ≤ a ^ 2 * b ^ 2 * c ^ 2 := by refine mul_le_mul h₅ h₄₃ ?_ ?_ . refine le_of_lt ?_ exact mul_pos hb ha . refine mul_nonneg ?_ ?_ . exact sq_nonneg a . exact sq_nonneg b linarith lemma imo_1964_p2_7 (a b c : ℝ) -- (h₀ : 0 < a ∧ 0 < b ∧ 0 < c) -- (h₁ : c < a + b) -- (h₂ : b < a + c) -- (h₃ : a < b + c) (ha : 0 < b + c - a) -- (hb : 0 < a + c - b) (hc : 0 < a + b - c) (h₄₁ : (a + b - c) * (a + c - b) ≤ a ^ 2) (h₄₂ : (a + b - c) * (b + c - a) ≤ b ^ 2) : -- (h₄₃ : (a + c - b) * (b + c - a) ≤ c ^ 2) -- (h₄₄ : ((a + b - c) * (a + c - b) * (b + c - a)) ^ 2 = -- (a + b - c) * (a + c - b) * ((a + b - c) * (b + c - a)) * ((a + c - b) * (b + c - a))) : (a + b - c) * (a + c - b) * ((a + b - c) * (b + c - a)) ≤ a ^ 2 * b ^ 2 := by refine mul_le_mul h₄₁ h₄₂ ?_ ?_ . refine le_of_lt ?_ exact mul_pos hc ha . exact sq_nonneg a lemma imo_1964_p2_8 (a b c : ℝ) (h₀ : 0 < a ∧ 0 < b ∧ 0 < c) -- (h₁ : c < a + b) -- (h₂ : b < a + c) -- (h₃ : a < b + c) -- (ha : 0 < b + c - a) -- (hb : 0 < a + c - b) -- (hc : 0 < a + b - c) (h₄ : ((a + b - c) * (a + c - b) * (b + c - a)) ^ 2 ≤ (a * b * c) ^ 2) : (a + b - c) * (a + c - b) * (b + c - a) ≤ a * b * c := by refine le_of_pow_le_pow_left₀ ?_ ?_ h₄ . norm_num . refine le_of_lt ?_ refine mul_pos ?_ h₀.2.2 exact mul_pos h₀.1 h₀.2.1 lemma imo_1964_p2_9 (a b c : ℝ) -- (h₀ : 0 < a ∧ 0 < b ∧ 0 < c) -- (h₁ : c < a + b) -- (h₂ : b < a + c) -- (h₃ : a < b + c) -- (ha : 0 < b + c - a) -- (hb : 0 < a + c - b) -- (hc : 0 < a + b - c) -- (h₄ : ((a + b - c) * (a + c - b) * (b + c - a)) ^ 2 ≤ (a * b * c) ^ 2) (h₅ : (a + b - c) * (a + c - b) * (b + c - a) ≤ a * b * c) : a ^ 2 * (b + c - a) + b ^ 2 * (c + a - b) + c ^ 2 * (a + b - c) ≤ 3 * a * b * c := by repeat rw [mul_sub] repeat rw [mul_add] linarith