Require Import TestSuite.admit. (* -*- mode: coq; coq-prog-args: ("-indices-matter") -*- *) (* NOTE: This bug is only triggered with -load-vernac-source / in interactive mode. *) (* File reduced by coq-bug-finder from 139 lines to 124 lines. *) Set Universe Polymorphism. Reserved Notation "g 'o' f" (at level 40, left associativity). Generalizable All Variables. Inductive paths {A : Type} (a : A) : A -> Type := idpath : paths a a. Arguments idpath {A a} , [A] a. Notation "x = y :> A" := (@paths A x y) : type_scope. Notation "x = y" := (x = y :>_) : type_scope. Definition transport {A : Type} (P : A -> Type) {x y : A} (p : x = y) (u : P x) : P y := match p with idpath => u end. Definition ap {A B:Type} (f:A -> B) {x y:A} (p:x = y) : f x = f y := match p with idpath => idpath end. Definition apD10 {A} {B:A->Type} {f g : forall x, B x} (h:f=g) : forall x, f x = g x := fun x => match h with idpath => idpath end. Definition ap11 {A B} {f g:A->B} (h:f=g) {x y:A} (p:x=y) : f x = g y. admit. Defined. Class IsEquiv {A B : Type} (f : A -> B) := {}. Class Contr_internal (A : Type) := BuildContr { center : A ; contr : (forall y : A, center = y) }. Arguments center A {_}. Inductive trunc_index : Type := | minus_two : trunc_index | trunc_S : trunc_index -> trunc_index. Fixpoint nat_to_trunc_index (n : nat) : trunc_index := match n with | 0 => trunc_S (trunc_S minus_two) | S n' => trunc_S (nat_to_trunc_index n') end. Coercion nat_to_trunc_index : nat >-> trunc_index. Fixpoint IsTrunc_internal (n : trunc_index) (A : Type) : Type := match n with | minus_two => Contr_internal A | trunc_S n' => forall (x y : A), IsTrunc_internal n' (x = y) end. Class IsTrunc (n : trunc_index) (A : Type) : Type := Trunc_is_trunc : IsTrunc_internal n A. Instance istrunc_paths (A : Type) n `{H : IsTrunc (trunc_S n) A} (x y : A) : IsTrunc n (x = y) := H x y. Notation Contr := (IsTrunc minus_two). Notation IsHSet := (IsTrunc 0). Class Funext := { isequiv_apD10 :> forall (A : Type) (P : A -> Type) f g, IsEquiv (@apD10 A P f g) }. Global Instance contr_forall `{Funext} `{P : A -> Type} `{forall a, Contr (P a)} : Contr (forall a, P a) | 100. admit. Defined. Hint Extern 0 => progress change Contr_internal with Contr in * : typeclass_instances. Global Instance trunc_forall `{Funext} `{P : A -> Type} `{forall a, IsTrunc n (P a)} : IsTrunc n (forall a, P a) | 100. Proof. generalize dependent P. induction n as [ | n' IH]; [ | admit ]; simpl; intros P ?. exact _. Defined. Set Implicit Arguments. Record PreCategory := { object :> Type; morphism : object -> object -> Type; identity : forall x, morphism x x; compose : forall s d d', morphism d d' -> morphism s d -> morphism s d'; trunc_morphism : forall s d, IsHSet (morphism s d) }. Existing Instance trunc_morphism. Infix "o" := (@compose _ _ _ _) : morphism_scope. Local Open Scope morphism_scope. Record Functor (C D : PreCategory) := { object_of :> C -> D; morphism_of : forall s d, morphism C s d -> morphism D (object_of s) (object_of d); composition_of : forall s d d' (m1 : morphism C s d) (m2: morphism C d d'), morphism_of _ _ (m2 o m1) = (morphism_of _ _ m2) o (morphism_of _ _ m1); identity_of : forall x, morphism_of _ _ (@identity _ x) = @identity _ (object_of x) }. Definition Sect {A B : Type} (s : A -> B) (r : B -> A) := forall x : A, r (s x) = x. Section path_functor. Context `{Funext}. Variable C : PreCategory. Variable D : PreCategory. Local Notation path_functor'_T F G := { HO : object_of F = object_of G & transport (fun GO => forall s d, morphism C s d -> morphism D (GO s) (GO d)) HO (morphism_of F) = morphism_of G } (only parsing). Definition path_functor'_sig (F G : Functor C D) : path_functor'_T F G -> F = G. Proof. intros [H' H'']. destruct F, G; simpl in *. induction H'. (* while destruct H' works *) destruct H''. apply ap11; [ apply ap | ]; apply center; abstract exact _. Set Printing Universes. (* Fail Defined.*) (* The command has indeed failed with message: => Error: path_functor'_sig_subproof already exists. *) Defined. (* Anomaly: Backtrack.backto 55: a state with no vcs_backup. Please report. *) End path_functor.