(* Check that "where" clause behaves as if given independently of the *) (* definition (variant of BZ#1132 submitted by Assia Mahboubi) *) Fixpoint plus1 (n m:nat) {struct n} : nat := match n with | O => m | S p => S (p+m) end where "n + m" := (plus1 n m) : nat_scope. (* Check behaviour wrt yet empty levels (see Stephane's bug #1850) *) Parameter P : Type -> Type -> Type -> Type. Notation "e |= t --> v" := (P e t v) (at level 100, t at level 54). Check (nat |= nat --> nat). (* Check that first non empty definition at an empty level can be of any associativity *) Module Type v1. Notation "x +1" := (S x) (at level 8, left associativity). End v1. Module Type v2. Notation "x +1" := (S x) (at level 8, right associativity). End v2. (* Check that empty levels (here 8 and 2 in pattern) are added in the right order *) Notation "' 'C_' G ( A )" := (A,G) (at level 8, G at level 2). (* Check import of notations from within a section *) Notation "+1 x" := (S x) (at level 25, x at level 9). Section A. Require Import make_notation. End A. (* Check use of "$" (see bug #1961) *) Notation "$ x" := (id x) (at level 30). Check ($ 5). (* Check regression of bug #2087 *) Notation "'exists' x , P" := (x, P) (at level 200, x ident, right associativity, only parsing). Definition foo P := let '(exists x, Q) := P in x = Q :> nat. (* Check empty levels when extending binder_constr *) Notation "'exists' x >= y , P" := (exists x, x >= y /\ P)%nat (at level 200, x ident, right associativity, y at level 69). (* This used to loop at some time before r12491 *) Notation R x := (@pair _ _ x). Check (fun x:nat*nat => match x with R x y => (x,y) end). (* Check multi-tokens recursive notations *) Local Notation "[ a # ; .. # ; b ]" := (a + .. (b + 0) ..). Check [ 0 ]. Check [ 0 # ; 1 ]. (* Check well-scoping of alpha-renaming of private binders *) (* see bug #2248 (thanks to Marc Lasson) *) Notation "{ q , r | P }" := (fun (p:nat*nat) => let (q, r) := p in P). Check (fun p => {q,r| q + r = p}). (* Check that declarations of empty levels are correctly backtracked *) Section B. Notation "*" := 5 (at level 0) : nat_scope. Notation "[ h ] p" := (h + p) (at level 8, p at level 9, h at level 7) : nat_scope. End B. (* Should succeed *) Definition n := 5 * 5. (* Check that lonely notations (here FOO) do not modify the visibility of scoped interpretations (bug #2634 fixed in r14819) *) Notation "x ++++ y" := (mult x y) (at level 40). Notation "x ++++ y" := (plus x y) : A_scope. Open Scope A_scope. Notation "'FOO' x" := (S x) (at level 40). Goal (2 ++++ 3) = 5. reflexivity. Abort. (* Check correct failure handling when a non-constructor notation is used in cases pattern (bug #2724 in 8.3 and 8.4beta) *) Notation "'FORALL' x .. y , P" := (forall x, .. (forall y, P) ..) (at level 200, x binder, y binder, right associativity) : type_scope. Fail Check fun x => match x with S (FORALL x, _) => 0 end. (* Bug #2708: don't check for scope of variables used as binder *) Parameter traverse : (nat -> unit) -> (nat -> unit). Notation traverse_var f l := (traverse (fun l => f l) l). (* Check that when an ident become a keyword, it does not break previous rules relying on the string to be classified as an ident *) Notation "'intros' x" := (S x) (at level 0). Goal True -> True. intros H. exact H. Qed. (* Check absence of collision on ".." in nested notations with ".." *) Notation "[ a , .. , b ]" := (a, (.. (b,tt) ..)). (* Check that vector notations do not break Ltac [] (bugs #4785, #4733) *) Require Import Coq.Vectors.VectorDef. Import VectorNotations. Goal True. idtac; []. (* important for test: no space here *) constructor. Qed. (* Check parsing of { and } is not affected by notations #3479 *) Notation " |- {{ a }} b" := (a=b) (no associativity, at level 10). Goal True. {{ exact I. }} Qed. Check |- {{ 0 }} 0. (* Check parsing of { and } is not affected by notations #3479 *) Notation " |- {{ a }} b" := (a=b) (no associativity, at level 10). Goal True. {{ exact I. }} Qed. (* Check that we can have notations without any symbol iff they are "only printing". *) Fail Notation "" := (@nil). Notation "" := (@nil) (only printing). (* Check that a notation cannot be neither parsing nor printing. *) Fail Notation "'foobarkeyword'" := (@nil) (only parsing, only printing). (* Check "where" clause for inductive types with parameters *) Reserved Notation "x === y" (at level 50). Inductive EQ {A} (x:A) : A -> Prop := REFL : x === x where "x === y" := (EQ x y). (* Check that strictly ident or _ are coerced to a name *) Fail Check {x@{u},y|x=x}. Fail Check {?[n],y|0=0}. (* Check that 10 is well declared left associative *) Section C. Notation "f $$$ x" := (id f x) (at level 10, left associativity). End C.