@@ -717,6 +717,9 @@ nonNeg∧nonPos⇒0 {mkℚᵘ +0 _} _ _ = *≡* refl
717717 q + r ≈⟨ +-comm q r ⟩
718718 r + q ∎ where open ≤-Reasoning
719719
720+ p+p≃0⇒p≃0 : ∀ p → p + p ≃ 0ℚᵘ → p ≃ 0ℚᵘ
721+ p+p≃0⇒p≃0 (mkℚᵘ (ℤ.+ ℕ.zero) _) (*≡* _) = *≡* refl
722+
720723------------------------------------------------------------------------
721724-- Properties of _+_ and -_
722725
@@ -729,6 +732,13 @@ neg-distrib-+ p q = ↥↧≡⇒≡ (begin
729732 ) refl
730733 where open ≡-Reasoning
731734
735+ p≃-p⇒p≃0 : ∀ p → p ≃ - p → p ≃ 0ℚᵘ
736+ p≃-p⇒p≃0 p p≃-p = p+p≃0⇒p≃0 p (begin-equality
737+ p + p ≈⟨ +-congʳ p p≃-p ⟩
738+ p - p ≈⟨ +-inverseʳ p ⟩
739+ 0ℚᵘ ∎)
740+ where open ≤-Reasoning
741+
732742------------------------------------------------------------------------
733743-- Properties of _+_ and _≤_
734744
@@ -1647,6 +1657,11 @@ neg-distrib-⊓-⊔ = antimono-≤-distrib-⊓ neg-mono-≤
16471657∣p∣≃0⇒p≃0 {mkℚᵘ (ℤ.+ n) d-1} p≃0ℚ = p≃0ℚ
16481658∣p∣≃0⇒p≃0 {mkℚᵘ -[1+ n ] d-1} (*≡* ())
16491659
1660+ 0≤∣p∣ : ∀ p → 0ℚᵘ ≤ ∣ p ∣
1661+ 0≤∣p∣ (mkℚᵘ ℤ.+0 _) = *≤* (ℤ.+≤+ ℕ.z≤n)
1662+ 0≤∣p∣ (mkℚᵘ ℤ.+[1+ _ ] _) = *≤* (ℤ.+≤+ ℕ.z≤n)
1663+ 0≤∣p∣ (mkℚᵘ ℤ.-[1+ _ ] _) = *≤* (ℤ.+≤+ ℕ.z≤n)
1664+
16501665∣-p∣≡∣p∣ : ∀ p → ∣ - p ∣ ≡ ∣ p ∣
16511666∣-p∣≡∣p∣ (mkℚᵘ +[1+ n ] d) = refl
16521667∣-p∣≡∣p∣ (mkℚᵘ +0 d) = refl
@@ -1674,6 +1689,11 @@ neg-distrib-⊓-⊔ = antimono-≤-distrib-⊓ neg-mono-≤
16741689∣p∣≡p∨∣p∣≡-p (mkℚᵘ (ℤ.+ n) d-1) = inj₁ refl
16751690∣p∣≡p∨∣p∣≡-p (mkℚᵘ (-[1+ n ]) d-1) = inj₂ refl
16761691
1692+ ∣p∣≃p⇒0≤p : ∀ {p} → ∣ p ∣ ≃ p → 0ℚᵘ ≤ p
1693+ ∣p∣≃p⇒0≤p {p} ∣p∣≃p with ∣p∣≡p∨∣p∣≡-p p
1694+ ... | inj₁ ∣p∣≡p = ∣p∣≡p⇒0≤p ∣p∣≡p
1695+ ... | inj₂ ∣p∣≡-p rewrite ∣p∣≡-p = ≤-reflexive (≃-sym (p≃-p⇒p≃0 p (≃-sym ∣p∣≃p)))
1696+
16771697∣p+q∣≤∣p∣+∣q∣ : ∀ p q → ∣ p + q ∣ ≤ ∣ p ∣ + ∣ q ∣
16781698∣p+q∣≤∣p∣+∣q∣ p q = *≤* (begin
16791699 ↥ ∣ p + q ∣ ℤ.* ↧ (∣ p ∣ + ∣ q ∣) ≡⟨⟩
@@ -1732,6 +1752,16 @@ neg-distrib-⊓-⊔ = antimono-≤-distrib-⊓ neg-mono-≤
17321752∣p*q∣≃∣p∣*∣q∣ : ∀ p q → ∣ p * q ∣ ≃ ∣ p ∣ * ∣ q ∣
17331753∣p*q∣≃∣p∣*∣q∣ p q = ≃-reflexive (∣p*q∣≡∣p∣*∣q∣ p q)
17341754
1755+ ∣∣p∣∣≡∣p∣ : ∀ p → ∣ ∣ p ∣ ∣ ≡ ∣ p ∣
1756+ ∣∣p∣∣≡∣p∣ p = 0≤p⇒∣p∣≡p (0≤∣p∣ p)
1757+
1758+ ∣∣p∣∣≃∣p∣ : ∀ p → ∣ ∣ p ∣ ∣ ≃ ∣ p ∣
1759+ ∣∣p∣∣≃∣p∣ p = ≃-reflexive (∣∣p∣∣≡∣p∣ p)
1760+
1761+ ∣-∣-nonNeg : ∀ p → NonNegative ∣ p ∣
1762+ ∣-∣-nonNeg (mkℚᵘ +[1+ _ ] _) = _
1763+ ∣-∣-nonNeg (mkℚᵘ +0 _) = _
1764+ ∣-∣-nonNeg (mkℚᵘ -[1+ _ ] _) = _
17351765
17361766------------------------------------------------------------------------
17371767-- DEPRECATED NAMES
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