Require Import TestSuite.admit. (* -*- mode: coq; coq-prog-args: ("-emacs" "-indices-matter") -*- *) Set Universe Polymorphism. Inductive Empty : Prop := . Inductive paths {A : Type} (a : A) : A -> Type := idpath : paths a a. Notation "x = y :> A" := (@paths A x y) : type_scope. Notation "x = y" := (x = y :>_) : type_scope. Arguments idpath {A a} , [A] a. Definition idmap {A : Type} : A -> A := fun x => x. Definition path_sum {A B : Type} (z z' : A + B) (pq : match z, z' with | inl z0, inl z'0 => z0 = z'0 | inr z0, inr z'0 => z0 = z'0 | _, _ => Empty end) : z = z'. admit. Defined. Definition ap {A B:Type} (f:A -> B) {x y:A} (p:x = y) : f x = f y := match p with idpath => idpath end. Theorem ex2_8 {A B A' B' : Type} (g : A -> A') (h : B -> B') (x y : A + B) (pq : match (x, y) with (inl x', inl y') => x' = y' | (inr x', inr y') => x' = y' | _ => Empty end) : let f z := match z with inl z' => inl (g z') | inr z' => inr (h z') end in ap f (path_sum x y pq) = path_sum (f x) (f y) ((match x as x return match (x, y) with (inl x', inl y') => x' = y' | (inr x', inr y') => x' = y' | _ => Empty end -> match (f x, f y) with | (inl x', inl y') => x' = y' | (inr x', inr y') => x' = y' | _ => Empty end with | inl x' => match y with | inl y' => ap g | inr y' => idmap end | inr x' => match y with | inl y' => idmap | inr y' => ap h end end) pq). Admitted. (* Toplevel input, characters 20-29: Error: Matching on term "f y" of type "A' + B'" expects 2 branches. *)