{-# OPTIONS --safe #-}
module Cubical.Foundations.GroupoidLaws where
open import Cubical.Foundations.Prelude
private
variable
ℓ : Level
A : Type ℓ
x y z w v : A
_⁻¹ : (x ≡ y) → (y ≡ x)
x≡y ⁻¹ = sym x≡y
infix 40 _⁻¹
symInvo : (p : x ≡ y) → p ≡ p ⁻¹ ⁻¹
symInvo p = refl
rUnit : (p : x ≡ y) → p ≡ p ∙ refl
rUnit p j i = compPath-filler p refl j i
lUnit-filler : {x y : A} (p : x ≡ y) → I → I → I → A
lUnit-filler {x = x} p j k i =
hfill (λ j → λ { (i = i0) → x
; (i = i1) → p (~ k ∨ j )
; (k = i0) → p i
}) (inS (p (~ k ∧ i ))) j
lUnit : (p : x ≡ y) → p ≡ refl ∙ p
lUnit p j i = lUnit-filler p i1 j i
symRefl : refl {x = x} ≡ refl ⁻¹
symRefl i = refl
compPathRefl : refl {x = x} ≡ refl ∙ refl
compPathRefl = rUnit refl
rCancel-filler : ∀ {x y : A} (p : x ≡ y) → (k j i : I) → A
rCancel-filler {x = x} p k j i =
hfill (λ k → λ { (i = i0) → x
; (i = i1) → p (~ k ∧ ~ j)
; (j = i1) → x
}) (inS (p (i ∧ ~ j))) k
rCancel : (p : x ≡ y) → p ∙ p ⁻¹ ≡ refl
rCancel {x = x} p j i = rCancel-filler p i1 j i
rCancel-filler' : ∀ {ℓ} {A : Type ℓ} {x y : A} (p : x ≡ y) → (i j k : I) → A
rCancel-filler' {x = x} {y} p i j k =
hfill
(λ i → λ
{ (j = i1) → p (~ i ∧ k)
; (k = i0) → x
; (k = i1) → p (~ i)
})
(inS (p k))
(~ i)
rCancel' : ∀ {ℓ} {A : Type ℓ} {x y : A} (p : x ≡ y) → p ∙ p ⁻¹ ≡ refl
rCancel' p j k = rCancel-filler' p i0 j k
lCancel : (p : x ≡ y) → p ⁻¹ ∙ p ≡ refl
lCancel p = rCancel (p ⁻¹)
assoc : (p : x ≡ y) (q : y ≡ z) (r : z ≡ w) →
p ∙ q ∙ r ≡ (p ∙ q) ∙ r
assoc p q r k = (compPath-filler p q k) ∙ compPath-filler' q r (~ k)
symInvoP : {A : I → Type ℓ} → {x : A i0} → {y : A i1} → (p : PathP A x y) →
PathP (λ j → PathP (λ i → symInvo (λ i → A i) j i) x y) p (symP (symP p))
symInvoP p = refl
rUnitP : {A : I → Type ℓ} → {x : A i0} → {y : A i1} → (p : PathP A x y) →
PathP (λ j → PathP (λ i → rUnit (λ i → A i) j i) x y) p (compPathP p refl)
rUnitP p j i = compPathP-filler p refl j i
rUnitP' : ∀ {ℓ'} {A : Type ℓ} (B : A → Type ℓ')
{x y : A} {p : x ≡ y} {z : B x} {w : B y}
(q : PathP (λ i → B (p i)) z w)
→ PathP (λ j → PathP (λ i → B (rUnit p j i)) z w) q (compPathP' {B = B} q refl)
rUnitP' B {w = w} q j i = compPathP'-filler {B = B} q (refl {x = w}) j i
lUnitP : {A : I → Type ℓ} → {x : A i0} → {y : A i1} → (p : PathP A x y) →
PathP (λ j → PathP (λ i → lUnit (λ i → A i) j i) x y) p (compPathP refl p)
lUnitP {A = A} {x = x} p k i =
comp (λ j → lUnit-filler (λ i → A i) j k i)
(λ j → λ { (i = i0) → x
; (i = i1) → p (~ k ∨ j )
; (k = i0) → p i
}) (p (~ k ∧ i ))
lUnitP' : ∀ {ℓ'} {A : Type ℓ} (B : A → Type ℓ')
{x y : A} {p : x ≡ y} {z : B x} {w : B y}
(q : PathP (λ i → B (p i)) z w)
→ PathP (λ j → PathP (λ i → B (lUnit p j i)) z w) q (compPathP' {B = B} refl q)
lUnitP' B {p = p} {z = z} q k i =
comp (λ j → B (lUnit-filler p j k i))
(λ j → λ { (i = i0) → z
; (i = i1) → q (~ k ∨ j )
; (k = i0) → q i
}) (q (~ k ∧ i ))
rCancelP : {A : I → Type ℓ} → {x : A i0} → {y : A i1} → (p : PathP A x y) →
PathP (λ j → PathP (λ i → rCancel (λ i → A i) j i) x x) (compPathP p (symP p)) refl
rCancelP {A = A} {x = x} p j i =
comp (λ k → rCancel-filler (λ i → A i) k j i)
(λ k → λ { (i = i0) → x
; (i = i1) → p (~ k ∧ ~ j)
; (j = i1) → x
}) (p (i ∧ ~ j))
lCancelP : {A : I → Type ℓ} → {x : A i0} → {y : A i1} → (p : PathP A x y) →
PathP (λ j → PathP (λ i → lCancel (λ i → A i) j i) y y) (compPathP (symP p) p) refl
lCancelP p = rCancelP (symP p)
assocP : {A : I → Type ℓ} {x : A i0} {y : A i1} {B_i1 : Type ℓ} {B : (A i1) ≡ B_i1} {z : B i1}
{C_i1 : Type ℓ} {C : (B i1) ≡ C_i1} {w : C i1} (p : PathP A x y) (q : PathP (λ i → B i) y z) (r : PathP (λ i → C i) z w) →
PathP (λ j → PathP (λ i → assoc (λ i → A i) B C j i) x w) (compPathP p (compPathP q r)) (compPathP (compPathP p q) r)
assocP {A = A} {B = B} {C = C} p q r k i =
comp (\ j' → hfill (λ j → λ {
(i = i0) → A i0
; (i = i1) → compPath-filler' (λ i₁ → B i₁) (λ i₁ → C i₁) (~ k) j })
(inS (compPath-filler (λ i₁ → A i₁) (λ i₁ → B i₁) k i)) j')
(λ j → λ
{ (i = i0) → p i0
; (i = i1) →
comp (\ j' → hfill ((λ l → λ
{ (j = i0) → B k
; (j = i1) → C l
; (k = i1) → C (j ∧ l)
})) (inS (B ( j ∨ k)) ) j')
(λ l → λ
{ (j = i0) → q k
; (j = i1) → r l
; (k = i1) → r (j ∧ l)
})
(q (j ∨ k))
})
(compPathP-filler p q k i)
invSides-filler : {x y z : A} (p : x ≡ y) (q : x ≡ z) → Square p (sym q) q (sym p)
invSides-filler {x = x} p q i j =
hcomp (λ k → λ { (i = i0) → p (k ∧ j)
; (i = i1) → q (~ j ∧ k)
; (j = i0) → q (i ∧ k)
; (j = i1) → p (~ i ∧ k)})
x
leftright : {ℓ : Level} {A : Type ℓ} {x y z : A} (p : x ≡ y) (q : y ≡ z) →
(refl ∙∙ p ∙∙ q) ≡ (p ∙∙ q ∙∙ refl)
leftright p q i j =
hcomp (λ t → λ { (j = i0) → p (i ∧ (~ t))
; (j = i1) → q (t ∨ i) })
(invSides-filler q (sym p) (~ i) j)
split-leftright : {ℓ : Level} {A : Type ℓ} {w x y z : A} (p : w ≡ x) (q : x ≡ y) (r : y ≡ z) →
(p ∙∙ q ∙∙ r) ≡ (refl ∙∙ (p ∙∙ q ∙∙ refl) ∙∙ r)
split-leftright p q r j i =
hcomp (λ t → λ { (i = i0) → p (~ j ∧ ~ t)
; (i = i1) → r t })
(doubleCompPath-filler p q refl j i)
split-leftright' : {ℓ : Level} {A : Type ℓ} {w x y z : A} (p : w ≡ x) (q : x ≡ y) (r : y ≡ z) →
(p ∙∙ q ∙∙ r) ≡ (p ∙∙ (refl ∙∙ q ∙∙ r) ∙∙ refl)
split-leftright' p q r j i =
hcomp (λ t → λ { (i = i0) → p (~ t)
; (i = i1) → r (j ∨ t) })
(doubleCompPath-filler refl q r j i)
doubleCompPath-elim : {ℓ : Level} {A : Type ℓ} {w x y z : A} (p : w ≡ x) (q : x ≡ y)
(r : y ≡ z) → (p ∙∙ q ∙∙ r) ≡ (p ∙ q) ∙ r
doubleCompPath-elim p q r = (split-leftright p q r) ∙ (λ i → (leftright p q (~ i)) ∙ r)
doubleCompPath-elim' : {ℓ : Level} {A : Type ℓ} {w x y z : A} (p : w ≡ x) (q : x ≡ y)
(r : y ≡ z) → (p ∙∙ q ∙∙ r) ≡ p ∙ (q ∙ r)
doubleCompPath-elim' p q r = (split-leftright' p q r) ∙ (sym (leftright p (q ∙ r)))
cong-∙∙-filler : ∀ {ℓ ℓ'} {A : Type ℓ} {B : Type ℓ'} {x y z w : A}
(f : A → B) (p : w ≡ x) (q : x ≡ y) (r : y ≡ z)
→ I → I → I → B
cong-∙∙-filler {A = A} f p q r k j i =
hfill ((λ k → λ { (j = i1) → doubleCompPath-filler (cong f p) (cong f q) (cong f r) k i
; (j = i0) → f (doubleCompPath-filler p q r k i)
; (i = i0) → f (p (~ k))
; (i = i1) → f (r k) }))
(inS (f (q i)))
k
cong-∙∙ : ∀ {B : Type ℓ} (f : A → B) (p : w ≡ x) (q : x ≡ y) (r : y ≡ z)
→ cong f (p ∙∙ q ∙∙ r) ≡ (cong f p) ∙∙ (cong f q) ∙∙ (cong f r)
cong-∙∙ f p q r j i = cong-∙∙-filler f p q r i1 j i
cong-∙ : ∀ {B : Type ℓ} (f : A → B) (p : x ≡ y) (q : y ≡ z)
→ cong f (p ∙ q) ≡ (cong f p) ∙ (cong f q)
cong-∙ f p q = cong-∙∙ f refl p q
hcomp-unique : ∀ {ℓ} {A : Type ℓ} {φ}
→ (u : I → Partial φ A) → (u0 : A [ φ ↦ u i0 ])
→ (h2 : ∀ i → A [ (φ ∨ ~ i) ↦ (\ { (φ = i1) → u i 1=1; (i = i0) → outS u0}) ])
→ (hcomp u (outS u0) ≡ outS (h2 i1)) [ φ ↦ (\ { (φ = i1) → (\ i → u i1 1=1)}) ]
hcomp-unique {φ = φ} u u0 h2 = inS (\ i → hcomp (\ k → \ { (φ = i1) → u k 1=1
; (i = i1) → outS (h2 k) })
(outS u0))
hlid-unique : ∀ {ℓ} {A : Type ℓ} {φ}
→ (u : I → Partial φ A) → (u0 : A [ φ ↦ u i0 ])
→ (h1 h2 : ∀ i → A [ (φ ∨ ~ i) ↦ (\ { (φ = i1) → u i 1=1; (i = i0) → outS u0}) ])
→ (outS (h1 i1) ≡ outS (h2 i1)) [ φ ↦ (\ { (φ = i1) → (\ i → u i1 1=1)}) ]
hlid-unique {φ = φ} u u0 h1 h2 = inS (\ i → hcomp (\ k → \ { (φ = i1) → u k 1=1
; (i = i0) → outS (h1 k)
; (i = i1) → outS (h2 k) })
(outS u0))
comp-unique : ∀ {ℓ} {A : I → Type ℓ} {φ}
→ (u : (i : I) → Partial φ (A i)) → (u0 : A i0 [ φ ↦ u i0 ])
→ (h2 : ∀ i → A i [ (φ ∨ ~ i) ↦ (\ { (φ = i1) → u i 1=1; (i = i0) → outS u0}) ])
→ (comp A u (outS u0) ≡ outS (h2 i1)) [ φ ↦ (\ { (φ = i1) → (\ i → u i1 1=1)}) ]
comp-unique {A = A} {φ = φ} u u0 h2 = inS (\ i → comp A (\ k → \ { (φ = i1) → u k 1=1
; (i = i1) → outS (h2 k) })
(outS u0))
lid-unique : ∀ {ℓ} {A : I → Type ℓ} {φ}
→ (u : (i : I) → Partial φ (A i)) → (u0 : A i0 [ φ ↦ u i0 ])
→ (h1 h2 : ∀ i → A i [ (φ ∨ ~ i) ↦ (\ { (φ = i1) → u i 1=1; (i = i0) → outS u0}) ])
→ (outS (h1 i1) ≡ outS (h2 i1)) [ φ ↦ (\ { (φ = i1) → (\ i → u i1 1=1)}) ]
lid-unique {A = A} {φ = φ} u u0 h1 h2 = inS (\ i → comp A (\ k → \ { (φ = i1) → u k 1=1
; (i = i0) → outS (h1 k)
; (i = i1) → outS (h2 k) })
(outS u0))
transp-hcomp : ∀ {ℓ} (φ : I) {A' : Type ℓ}
(A : (i : I) → Type ℓ [ φ ↦ (λ _ → A') ]) (let B = \ (i : I) → outS (A i))
→ ∀ {ψ} (u : I → Partial ψ (B i0)) → (u0 : B i0 [ ψ ↦ u i0 ]) →
(transp (\ i → B i) φ (hcomp u (outS u0)) ≡ hcomp (\ i o → transp (\ i → B i) φ (u i o)) (transp (\ i → B i) φ (outS u0)))
[ ψ ↦ (\ { (ψ = i1) → (\ i → transp (\ i → B i) φ (u i1 1=1))}) ]
transp-hcomp φ A u u0 = inS (sym (outS (hcomp-unique
((\ i o → transp (\ i → B i) φ (u i o))) (inS (transp (\ i → B i) φ (outS u0)))
\ i → inS (transp (\ i → B i) φ (hfill u u0 i)))))
where
B = \ (i : I) → outS (A i)
hcomp-cong : ∀ {ℓ} {A : Type ℓ} {φ} → (u : I → Partial φ A) → (u0 : A [ φ ↦ u i0 ]) →
(u' : I → Partial φ A) → (u0' : A [ φ ↦ u' i0 ]) →
(ueq : ∀ i → PartialP φ (\ o → u i o ≡ u' i o)) → (outS u0 ≡ outS u0') [ φ ↦ (\ { (φ = i1) → ueq i0 1=1}) ]
→ (hcomp u (outS u0) ≡ hcomp u' (outS u0')) [ φ ↦ (\ { (φ = i1) → ueq i1 1=1 }) ]
hcomp-cong u u0 u' u0' ueq 0eq = inS (\ j → hcomp (\ i o → ueq i o j) (outS 0eq j))
congFunct-filler : ∀ {ℓ ℓ'} {A : Type ℓ} {B : Type ℓ'} {x y z : A} (f : A → B) (p : x ≡ y) (q : y ≡ z)
→ I → I → I → B
congFunct-filler {x = x} f p q i j z =
hfill (λ k → λ { (i = i0) → f x
; (i = i1) → f (q k)
; (j = i0) → f (compPath-filler p q k i)})
(inS (f (p i)))
z
congFunct : ∀ {ℓ} {B : Type ℓ} (f : A → B) (p : x ≡ y) (q : y ≡ z) → cong f (p ∙ q) ≡ cong f p ∙ cong f q
congFunct f p q j i = congFunct-filler f p q i j i1
congFunct-dep : ∀ {ℓ ℓ'} {A : Type ℓ} {B : A → Type ℓ'} {x y z : A} (f : (a : A) → B a) (p : x ≡ y) (q : y ≡ z)
→ PathP (λ i → PathP (λ j → B (compPath-filler p q i j)) (f x) (f (q i))) (cong f p) (cong f (p ∙ q))
congFunct-dep {B = B} {x = x} f p q i j = f (compPath-filler p q i j)
cong₂Funct : ∀ {ℓ ℓ'} {A : Type ℓ} {x y : A} {B : Type ℓ'} (f : A → A → B) →
(p : x ≡ y) →
{u v : A} (q : u ≡ v) →
cong₂ f p q ≡ cong (λ x → f x u) p ∙ cong (f y) q
cong₂Funct {x = x} {y = y} f p {u = u} {v = v} q j i =
hcomp (λ k → λ { (i = i0) → f x u
; (i = i1) → f y (q k)
; (j = i0) → f (p i) (q (i ∧ k))})
(f (p i) u)
symDistr-filler : ∀ {ℓ} {A : Type ℓ} {x y z : A} (p : x ≡ y) (q : y ≡ z) → I → I → I → A
symDistr-filler {A = A} {z = z} p q i j k =
hfill (λ k → λ { (i = i0) → q (k ∨ j)
; (i = i1) → p (~ k ∧ j) })
(inS (invSides-filler q (sym p) i j))
k
symDistr : ∀ {ℓ} {A : Type ℓ} {x y z : A} (p : x ≡ y) (q : y ≡ z) → sym (p ∙ q) ≡ sym q ∙ sym p
symDistr p q i j = symDistr-filler p q j i i1
hcomp-equivFillerSub : {ϕ : I} → (p : I → Partial ϕ A) → (a : A [ ϕ ↦ p i0 ])
→ (i : I)
→ A [ ϕ ∨ i ∨ ~ i ↦ (λ { (i = i0) → outS a
; (i = i1) → hcomp (λ i → p (~ i)) (hcomp p (outS a))
; (ϕ = i1) → p i0 1=1 }) ]
hcomp-equivFillerSub {ϕ = ϕ} p a i =
inS (hcomp (λ k → λ { (i = i1) → hfill (λ j → p (~ j)) (inS (hcomp p (outS a))) k
; (i = i0) → outS a
; (ϕ = i1) → p (~ k ∧ i) 1=1 })
(hfill p a i))
hcomp-equivFiller : {ϕ : I} → (p : I → Partial ϕ A) → (a : A [ ϕ ↦ p i0 ])
→ (i : I) → A
hcomp-equivFiller p a i = outS (hcomp-equivFillerSub p a i)
pentagonIdentity : (p : x ≡ y) → (q : y ≡ z) → (r : z ≡ w) → (s : w ≡ v)
→
(assoc p q (r ∙ s) ∙ assoc (p ∙ q) r s)
≡
cong (p ∙_) (assoc q r s) ∙∙ assoc p (q ∙ r) s ∙∙ cong (_∙ s) (assoc p q r)
pentagonIdentity {x = x} {y} p q r s =
(λ i →
(λ j → cong (p ∙_) (assoc q r s) (i ∧ j))
∙∙ (λ j → lemma₀₀ i j ∙ lemma₀₁ i j)
∙∙ (λ j → lemma₁₀ i j ∙ lemma₁₁ i j)
)
where
lemma₀₀ : ( i j : I) → _ ≡ _
lemma₀₀ i j i₁ =
hcomp
(λ k → λ { (j = i0) → p i₁
; (i₁ = i0) → x
; (i₁ = i1) → hcomp
(λ k₁ → λ { (i = i0) → (q (j ∧ k))
; (k = i0) → y
; (j = i0) → y
; (j = i1)(k = i1) → r (k₁ ∧ i)})
(q (j ∧ k))
}) (p i₁)
lemma₀₁ : ( i j : I) → hcomp
(λ k → λ {(i = i0) → q j
; (j = i0) → y
; (j = i1) → r (k ∧ i)
})
(q j) ≡ _
lemma₀₁ i j i₁ = (hcomp
(λ k → λ { (j = i1) → hcomp
(λ k₁ → λ { (i₁ = i0) → r i
; (k = i0) → r i
; (i = i1) → s (k₁ ∧ k ∧ i₁)
; (i₁ = i1)(k = i1) → s k₁ })
(r ((i₁ ∧ k) ∨ i))
; (i₁ = i0) → compPath-filler q r i j
; (i₁ = i1) → hcomp
(λ k₁ → λ { (k = i0) → r i
; (k = i1) → s k₁
; (i = i1) → s (k ∧ k₁)})
(r (i ∨ k))})
(hfill
(λ k → λ { (j = i1) → r k
; (i₁ = i1) → r k
; (i₁ = i0)(j = i0) → y })
(inS (q (i₁ ∨ j))) i))
lemma₁₁ : ( i j : I) → (r (i ∨ j)) ≡ _
lemma₁₁ i j i₁ =
hcomp
(λ k → λ { (i = i1) → s (i₁ ∧ k)
; (j = i1) → s (i₁ ∧ k)
; (i₁ = i0) → r (i ∨ j)
; (i₁ = i1) → s k
}) (r (i ∨ j ∨ i₁))
lemma₁₀-back : I → I → I → _
lemma₁₀-back i j i₁ =
hcomp
(λ k → λ {
(i₁ = i0) → x
; (i₁ = i1) → hcomp
(λ k₁ → λ { (k = i0) → q (j ∨ ~ i)
; (k = i1) → r (k₁ ∧ j)
; (j = i0) → q (k ∨ ~ i)
; (j = i1) → r (k₁ ∧ k)
; (i = i0) → r (k ∧ j ∧ k₁)
})
(q (k ∨ j ∨ ~ i))
; (i = i0)(j = i0) → (p ∙ q) i₁
})
(hcomp
(λ k → λ { (i₁ = i0) → x
; (i₁ = i1) → q ((j ∨ ~ i ) ∧ k)
; (j = i0)(i = i1) → p i₁
})
(p i₁))
lemma₁₀-front : I → I → I → _
lemma₁₀-front i j i₁ =
(((λ _ → x) ∙∙ compPath-filler p q j ∙∙
(λ i₁ →
hcomp
(λ k → λ { (i₁ = i0) → q j
; (i₁ = i1) → r (k ∧ (j ∨ i))
; (j = i0)(i = i0) → q i₁
; (j = i1) → r (i₁ ∧ k)
})
(q (j ∨ i₁))
)) i₁)
compPath-filler-in-filler :
(p : _ ≡ y) → (q : _ ≡ _ )
→ _≡_ {A = Square (p ∙ q) (p ∙ q) (λ _ → x) (λ _ → z)}
(λ i j → hcomp
(λ i₂ →
λ { (j = i0) → x
; (j = i1) → q (i₂ ∨ ~ i)
; (i = i0) → (p ∙ q) j
})
(compPath-filler p q (~ i) j))
(λ _ → p ∙ q)
compPath-filler-in-filler p q z i j =
hcomp
(λ k → λ {
(j = i0) → p i0
; (j = i1) → q (k ∨ ~ i ∧ ~ z)
; (i = i0) → hcomp
(λ i₂ → λ {
(j = i0) → p i0
;(j = i1) → q ((k ∨ ~ z) ∧ i₂)
;(z = i1) (k = i0) → p j
})
(p j)
; (i = i1) → compPath-filler p (λ i₁ → q (k ∧ i₁)) k j
; (z = i0) → hfill
((λ i₂ → λ { (j = i0) → p i0
; (j = i1) → q (i₂ ∨ ~ i)
; (i = i0) → (p ∙ q) j
}))
(inS ((compPath-filler p q (~ i) j))) k
; (z = i1) → compPath-filler p q k j
})
(compPath-filler p q (~ i ∧ ~ z) j)
cube-comp₋₀₋ :
(c : I → I → I → A)
→ {a' : Square _ _ _ _}
→ (λ i i₁ → c i i0 i₁) ≡ a'
→ (I → I → I → A)
cube-comp₋₀₋ c p i j k =
hcomp
(λ l → λ {
(i = i0) → c i0 j k
;(i = i1) → c i1 j k
;(j = i0) → p l i k
;(j = i1) → c i i1 k
;(k = i0) → c i j i0
;(k = i1) → c i j i1
})
(c i j k)
cube-comp₀₋₋ :
(c : I → I → I → A)
→ {a' : Square _ _ _ _}
→ (λ i i₁ → c i0 i i₁) ≡ a'
→ (I → I → I → A)
cube-comp₀₋₋ c p i j k =
hcomp
(λ l → λ {
(i = i0) → p l j k
;(i = i1) → c i1 j k
;(j = i0) → c i i0 k
;(j = i1) → c i i1 k
;(k = i0) → c i j i0
;(k = i1) → c i j i1
})
(c i j k)
lemma₁₀-back' : _
lemma₁₀-back' k j i₁ =
(cube-comp₋₀₋ (lemma₁₀-back)
(compPath-filler-in-filler p q)) k j i₁
lemma₁₀ : ( i j : I) → _ ≡ _
lemma₁₀ i j i₁ =
(cube-comp₀₋₋ lemma₁₀-front (sym lemma₁₀-back')) i j i₁
∙∙lCancel-fill : ∀ {ℓ} {A : Type ℓ} {x y : A}
→ (p : x ≡ y)
→ I → I → I → A
∙∙lCancel-fill p i j k =
hfill (λ k → λ { (i = i1) → p k
; (j = i0) → p k
; (j = i1) → p k})
(inS (p i0)) k
∙∙lCancel : ∀ {ℓ} {A : Type ℓ} {x y : A}
→ (p : x ≡ y)
→ sym p ∙∙ refl ∙∙ p ≡ refl
∙∙lCancel p i j = ∙∙lCancel-fill p i j i1