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I have the following code which I want to prove:

data Pair (A : Set) (B : A → Set) : Set where
  pair : (a : A) → (B a) → Pair A B

pairEq : (A : Set) → (B : A → Set) → (a : A) → (b₁ b₂ : B a) → (pair {A} {B} a b₁ ≡ pair {A} {B} a b₂) → b₁ ≡ b₂
pairEq A B a b₁ b₂ refl = {!!}

How can I prove this is agda? entering refl leads to an error. How can I work this around?

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People why do you downvote this? –  Konstantin Solomatov May 13 at 1:57

1 Answer 1

up vote 0 down vote accepted

I done it myself:

data Pair (A : Set) (B : A → Set) : Set where
  pair : (a : A) → (B a) → Pair A B

pairEq : (A : Set) → (B : A → Set) → (a : A) → (b₁ b₂ : B a) → (pair {A} {B} a b₁ ≡ pair {A} {B} a b₂) → b₁ ≡ b₂
pairEq A B a .b b refl = refl
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