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added docstrings to krull.lean
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@ -55,6 +55,7 @@ lemma le_krullDim_iff' (R : Type _) [CommRing R] (n : ℕ∞) :
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lemma height_le_krullDim (I : PrimeSpectrum R) : height I ≤ krullDim R :=
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lemma height_le_krullDim (I : PrimeSpectrum R) : height I ≤ krullDim R :=
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le_iSup (λ I : PrimeSpectrum R => (height I : WithBot ℕ∞)) I
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le_iSup (λ I : PrimeSpectrum R => (height I : WithBot ℕ∞)) I
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/-- The Krull dimension of a local ring is the height of its maximal ideal. -/
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lemma krullDim_eq_height [LocalRing R] : krullDim R = height (closedPoint R) := by
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lemma krullDim_eq_height [LocalRing R] : krullDim R = height (closedPoint R) := by
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apply le_antisymm
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apply le_antisymm
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. rw [krullDim_le_iff']
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. rw [krullDim_le_iff']
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@ -65,6 +66,8 @@ lemma krullDim_eq_height [LocalRing R] : krullDim R = height (closedPoint R) :=
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exact I.2.1
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exact I.2.1
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. simp only [height_le_krullDim]
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. simp only [height_le_krullDim]
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/-- The height of a prime `𝔭` is greater than `n` if and only if there is a chain of primes less than `𝔭`
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with length `n + 1`. -/
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lemma lt_height_iff' {𝔭 : PrimeSpectrum R} {n : ℕ∞} :
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lemma lt_height_iff' {𝔭 : PrimeSpectrum R} {n : ℕ∞} :
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height 𝔭 > n ↔ ∃ c : List (PrimeSpectrum R), c.Chain' (· < ·) ∧ (∀ 𝔮 ∈ c, 𝔮 < 𝔭) ∧ c.length = n + 1 := by
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height 𝔭 > n ↔ ∃ c : List (PrimeSpectrum R), c.Chain' (· < ·) ∧ (∀ 𝔮 ∈ c, 𝔮 < 𝔭) ∧ c.length = n + 1 := by
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rcases n with _ | n
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rcases n with _ | n
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@ -87,6 +90,7 @@ height 𝔭 > n ↔ ∃ c : List (PrimeSpectrum R), c.Chain' (· < ·) ∧ (∀
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norm_cast at hc
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norm_cast at hc
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tauto
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tauto
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/-- Form of `lt_height_iff''` for rewriting with the height coerced to `WithBot ℕ∞`. -/
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lemma lt_height_iff'' {𝔭 : PrimeSpectrum R} {n : ℕ∞} :
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lemma lt_height_iff'' {𝔭 : PrimeSpectrum R} {n : ℕ∞} :
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height 𝔭 > (n : WithBot ℕ∞) ↔ ∃ c : List (PrimeSpectrum R), c.Chain' (· < ·) ∧ (∀ 𝔮 ∈ c, 𝔮 < 𝔭) ∧ c.length = n + 1 := by
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height 𝔭 > (n : WithBot ℕ∞) ↔ ∃ c : List (PrimeSpectrum R), c.Chain' (· < ·) ∧ (∀ 𝔮 ∈ c, 𝔮 < 𝔭) ∧ c.length = n + 1 := by
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show (_ < _) ↔ _
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show (_ < _) ↔ _
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@ -96,9 +100,11 @@ height 𝔭 > (n : WithBot ℕ∞) ↔ ∃ c : List (PrimeSpectrum R), c.Chain'
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#check height_le_krullDim
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#check height_le_krullDim
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--some propositions that would be nice to be able to eventually
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--some propositions that would be nice to be able to eventually
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/-- The prime spectrum of the zero ring is empty. -/
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lemma primeSpectrum_empty_of_subsingleton (x : PrimeSpectrum R) [Subsingleton R] : False :=
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lemma primeSpectrum_empty_of_subsingleton (x : PrimeSpectrum R) [Subsingleton R] : False :=
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x.1.ne_top_iff_one.1 x.2.1 <| Eq.substr (Subsingleton.elim 1 (0 : R)) x.1.zero_mem
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x.1.ne_top_iff_one.1 x.2.1 <| Eq.substr (Subsingleton.elim 1 (0 : R)) x.1.zero_mem
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/-- A CommRing has empty prime spectrum if and only if it is the zero ring. -/
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lemma primeSpectrum_empty_iff : IsEmpty (PrimeSpectrum R) ↔ Subsingleton R := by
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lemma primeSpectrum_empty_iff : IsEmpty (PrimeSpectrum R) ↔ Subsingleton R := by
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constructor
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constructor
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. contrapose
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. contrapose
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@ -122,17 +128,20 @@ lemma dim_eq_bot_iff : krullDim R = ⊥ ↔ Subsingleton R := by
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. rw [h.forall_iff]
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. rw [h.forall_iff]
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trivial
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trivial
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/-- Nonzero rings have Krull dimension in ℕ∞ -/
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lemma krullDim_nonneg_of_nontrivial (R : Type _) [CommRing R] [Nontrivial R] : ∃ n : ℕ∞, Ideal.krullDim R = n := by
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lemma krullDim_nonneg_of_nontrivial (R : Type _) [CommRing R] [Nontrivial R] : ∃ n : ℕ∞, Ideal.krullDim R = n := by
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have h := dim_eq_bot_iff.not.mpr (not_subsingleton R)
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have h := dim_eq_bot_iff.not.mpr (not_subsingleton R)
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lift (Ideal.krullDim R) to ℕ∞ using h with k
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lift (Ideal.krullDim R) to ℕ∞ using h with k
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use k
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use k
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/-- An ideal which is less than a prime is not a maximal ideal. -/
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lemma not_maximal_of_lt_prime {p : Ideal R} {q : Ideal R} (hq : IsPrime q) (h : p < q) : ¬IsMaximal p := by
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lemma not_maximal_of_lt_prime {p : Ideal R} {q : Ideal R} (hq : IsPrime q) (h : p < q) : ¬IsMaximal p := by
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intro hp
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intro hp
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apply IsPrime.ne_top hq
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apply IsPrime.ne_top hq
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apply (IsCoatom.lt_iff hp.out).mp
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apply (IsCoatom.lt_iff hp.out).mp
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exact h
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exact h
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/-- Krull dimension is ≤ 0 if and only if all primes are maximal. -/
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lemma dim_le_zero_iff : krullDim R ≤ 0 ↔ ∀ I : PrimeSpectrum R, IsMaximal I.asIdeal := by
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lemma dim_le_zero_iff : krullDim R ≤ 0 ↔ ∀ I : PrimeSpectrum R, IsMaximal I.asIdeal := by
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show ((_ : WithBot ℕ∞) ≤ (0 : ℕ)) ↔ _
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show ((_ : WithBot ℕ∞) ≤ (0 : ℕ)) ↔ _
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rw [krullDim_le_iff R 0]
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rw [krullDim_le_iff R 0]
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@ -168,6 +177,7 @@ lemma dim_le_zero_iff : krullDim R ≤ 0 ↔ ∀ I : PrimeSpectrum R, IsMaximal
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apply not_maximal_of_lt_prime I.IsPrime
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apply not_maximal_of_lt_prime I.IsPrime
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exact hc2
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exact hc2
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/-- For a nonzero ring, Krull dimension is 0 if and only if all primes are maximal. -/
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lemma dim_eq_zero_iff [Nontrivial R] : krullDim R = 0 ↔ ∀ I : PrimeSpectrum R, IsMaximal I.asIdeal := by
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lemma dim_eq_zero_iff [Nontrivial R] : krullDim R = 0 ↔ ∀ I : PrimeSpectrum R, IsMaximal I.asIdeal := by
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rw [←dim_le_zero_iff]
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rw [←dim_le_zero_iff]
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obtain ⟨n, hn⟩ := krullDim_nonneg_of_nontrivial R
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obtain ⟨n, hn⟩ := krullDim_nonneg_of_nontrivial R
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@ -179,6 +189,7 @@ lemma dim_eq_zero_iff [Nontrivial R] : krullDim R = 0 ↔ ∀ I : PrimeSpectrum
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. rw [h']
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. rw [h']
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. exact le_antisymm h' this
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. exact le_antisymm h' this
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/-- In a field, the unique prime ideal is the zero ideal. -/
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@[simp]
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@[simp]
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lemma field_prime_bot {K: Type _} [Field K] (P : Ideal K) : IsPrime P ↔ P = ⊥ := by
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lemma field_prime_bot {K: Type _} [Field K] (P : Ideal K) : IsPrime P ↔ P = ⊥ := by
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constructor
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constructor
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@ -190,6 +201,7 @@ lemma field_prime_bot {K: Type _} [Field K] (P : Ideal K) : IsPrime P ↔ P =
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rw [botP]
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rw [botP]
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exact bot_prime
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exact bot_prime
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/-- In a field, all primes have height 0. -/
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lemma field_prime_height_zero {K: Type _} [Field K] (P : PrimeSpectrum K) : height P = 0 := by
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lemma field_prime_height_zero {K: Type _} [Field K] (P : PrimeSpectrum K) : height P = 0 := by
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unfold height
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unfold height
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simp
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simp
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@ -205,10 +217,12 @@ lemma field_prime_height_zero {K: Type _} [Field K] (P : PrimeSpectrum K) : heig
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have : J ≠ P := ne_of_lt JlP
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have : J ≠ P := ne_of_lt JlP
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contradiction
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contradiction
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/-- The Krull dimension of a field is 0. -/
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lemma dim_field_eq_zero {K : Type _} [Field K] : krullDim K = 0 := by
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lemma dim_field_eq_zero {K : Type _} [Field K] : krullDim K = 0 := by
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unfold krullDim
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unfold krullDim
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simp [field_prime_height_zero]
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simp [field_prime_height_zero]
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/-- A domain with Krull dimension 0 is a field. -/
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lemma domain_dim_zero.isField {D: Type _} [CommRing D] [IsDomain D] (h: krullDim D = 0) : IsField D := by
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lemma domain_dim_zero.isField {D: Type _} [CommRing D] [IsDomain D] (h: krullDim D = 0) : IsField D := by
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by_contra x
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by_contra x
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rw [Ring.not_isField_iff_exists_prime] at x
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rw [Ring.not_isField_iff_exists_prime] at x
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@ -230,6 +244,7 @@ lemma domain_dim_zero.isField {D: Type _} [CommRing D] [IsDomain D] (h: krullDim
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aesop
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aesop
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contradiction
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contradiction
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/-- A domain has Krull dimension 0 if and only if it is a field. -/
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lemma domain_dim_eq_zero_iff_field {D: Type _} [CommRing D] [IsDomain D] : krullDim D = 0 ↔ IsField D := by
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lemma domain_dim_eq_zero_iff_field {D: Type _} [CommRing D] [IsDomain D] : krullDim D = 0 ↔ IsField D := by
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constructor
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constructor
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· exact domain_dim_zero.isField
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· exact domain_dim_zero.isField
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@ -261,6 +276,7 @@ lemma dim_le_one_of_dimLEOne : Ring.DimensionLEOne R → krullDim R ≤ 1 := by
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specialize H q1.asIdeal (bot_lt_iff_ne_bot.mp q1nbot) q1.IsPrime
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specialize H q1.asIdeal (bot_lt_iff_ne_bot.mp q1nbot) q1.IsPrime
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exact (not_maximal_of_lt_prime p.IsPrime hc2) H
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exact (not_maximal_of_lt_prime p.IsPrime hc2) H
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/-- The Krull dimension of a PID is at most 1. -/
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lemma dim_le_one_of_pid [IsDomain R] [IsPrincipalIdealRing R] : krullDim R ≤ 1 := by
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lemma dim_le_one_of_pid [IsDomain R] [IsPrincipalIdealRing R] : krullDim R ≤ 1 := by
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rw [dim_le_one_iff]
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rw [dim_le_one_iff]
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exact Ring.DimensionLEOne.principal_ideal_ring R
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exact Ring.DimensionLEOne.principal_ideal_ring R
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