Agda-2.6.2.2.20230105: A dependently typed functional programming language and proof assistant
Safe HaskellSafe-Inferred
LanguageHaskell2010

Agda.TypeChecking.Rewriting

Description

Rewriting with arbitrary rules.

The user specifies a relation symbol by the pragma {-# BUILTIN REWRITE rel #-} where rel should be of type Δ → (lhs rhs : A) → Set i.

Then the user can add rewrite rules by the pragma {-# REWRITE q #-} where q should be a closed term of type Γ → rel us lhs rhs.

We then intend to add a rewrite rule Γ ⊢ lhs ↦ rhs : B to the signature where B = A[us/Δ].

To this end, we normalize lhs, which should be of the form f ts for a Def-symbol f (postulate, function, data, record, constructor). Further, FV(ts) = dom(Γ). The rule q :: Γ ⊢ f ts ↦ rhs : B is added to the signature to the definition of f.

When reducing a term Ψ ⊢ f vs is stuck, we try the rewrites for f, by trying to unify vs with ts. This is for now done by substituting fresh metas Xs for the bound variables in ts and checking equality with vs Ψ ⊢ (f ts)[XsΓ] = f vs : B[XsΓ] If successful (no open metas/constraints), we replace f vs by rhs[Xs/Γ] and continue reducing.

Synopsis

Documentation

verifyBuiltinRewrite :: Term -> Type -> TCM () Source #

Check that the name given to the BUILTIN REWRITE is actually a relation symbol. I.e., its type should be of the form Δ → (lhs : A) (rhs : B) → Set ℓ. Note: we do not care about hiding/non-hiding of lhs and rhs.

data RelView Source #

Deconstructing a type into Δ → t → t' → core.

Constructors

RelView 

Fields

relView :: Type -> TCM (Maybe RelView) Source #

Deconstructing a type into Δ → t → t' → core. Returns Nothing if not enough argument types.

addRewriteRules :: [QName] -> TCM () Source #

Check the given rewrite rules and add them to the signature.

rewriteRelationDom :: QName -> TCM (ListTel, Dom Type) Source #

Get domain of rewrite relation.

checkRewriteRule :: QName -> TCM RewriteRule Source #

Check the validity of q : Γ → rel us lhs rhs as rewrite rule Γ ⊢ lhs ↦ rhs : B where B = A[us/Δ]. Remember that rel : Δ → A → A → Set i, so rel us : (lhs rhs : A[us/Δ]) → Set i. Returns the checked rewrite rule to be added to the signature.

rewriteWith :: Type -> (Elims -> Term) -> RewriteRule -> Elims -> ReduceM (Either (Blocked Term) Term) Source #

rewriteWith t f es rew where f : t tries to rewrite f es with rew, returning the reduct if successful.

rewrite :: Blocked_ -> (Elims -> Term) -> RewriteRules -> Elims -> ReduceM (Reduced (Blocked Term) Term) Source #

rewrite b v rules es tries to rewrite v applied to es with the rewrite rules rules. b is the default blocking tag.