module equivProp where

import equivSet

-- The goal is to prove that equivalent propositions are equal

propExt : (A B : U) -> (prop A) -> (prop B) -> (A -> B) -> (B -> A) -> Id U A B
propExt A B pA pB f g = equivSet A B f g sfg injf setB
  where
  sfg : section A B f g
  sfg b = pB (f (g b)) b

  injf : injective A B f
  injf a0 a1 _ = pA a0 a1

  setB : set B
  setB = propUIP B pB