The metavariable context stores metavariable declarations and their
assignments. It is used in the elaborator, tactic framework, unifier
(aka isDefEq
), and type class resolution (TC). First, we list all
the requirements imposed by these modules.
- We may invoke TC while executing
isDefEq
. We need this feature to be able to solve unification problems such as:
f ?a (ringAdd ?s) ?x ?y =?= f Int intAdd n m
where (?a : Type) (?s : Ring ?a) (?x ?y : ?a)
During isDefEq
(i.e., unification), it will need to solve the constrain
ringAdd ?s =?= intAdd
We say ringAdd ?s
is stuck because it cannot be reduced until we
synthesize the term ?s : Ring ?a
using TC. This can be done since we
have assigned ?a := Int
when solving ?a =?= Int
.
-
TC uses
isDefEq
, andisDefEq
may create TC problems as shown above. Thus, we may have nested TC problems. -
isDefEq
extends the local context when going inside binders. Thus, the local context for nested TC may be an extension of the local context for outer TC. -
TC should not assign metavariables created by the elaborator, simp, tactic framework, and outer TC problems. Reason: TC commits to the first solution it finds. Consider the TC problem
Coe Nat ?x
, where?x
is a metavariable created by the caller. There are many solutions to this problem (e.g.,?x := Int
,?x := Real
, ...), and it doesn’t make sense to commit to the first one since TC does not know the constraints the caller may impose on?x
after the TC problem is solved. Remark: we claim it is not feasible to make the whole system backtrackable, and allow the caller to backtrack back to TC and ask it for another solution if the first one found did not work. We claim it would be too inefficient. -
TC metavariables should not leak outside of TC. Reason: we want to get rid of them after we synthesize the instance.
-
simp
invokesisDefEq
for matching the left-hand-side of equations to terms in our goal. Thus, it may invoke TC indirectly. -
In Lean3, we didn’t have to create a fresh pattern for trying to match the left-hand-side of equations when executing
simp
. We had a mechanism called "tmp" metavariables. It avoided this overhead, but it created many problems sincesimp
may indirectly call TC which may recursively call TC. Moreover, we may want to allow TC to invoke tactics in the future. Thus, whensimp
invokesisDefEq
, it may indirectly invoke a tactic andsimp
itself. The Lean3 approach assumed that metavariables were short-lived, this is not true in Lean4, and to some extent was also not true in Lean3 sincesimp
, in principle, could trigger an arbitrary number of nested TC problems. -
Here are some possible call stack traces we could have in Lean3 (and Lean4).
Elaborator (-> TC -> isDefEq)+
Elaborator -> isDefEq (-> TC -> isDefEq)*
Elaborator -> simp -> isDefEq (-> TC -> isDefEq)*
In Lean4, TC may also invoke tactics in the future.
-
In Lean3 and Lean4, TC metavariables are not really short-lived. We solve an arbitrary number of unification problems, and we may have nested TC invocations.
-
TC metavariables do not share the same local context even in the same invocation. In the C++ and Lean implementations we use a trick to ensure they do: https://github.com/leanprover/lean/blob/92826917a252a6092cffaf5fc5f1acb1f8cef379/src/library/type_context.cpp#L3583-L3594
-
Metavariables may be natural, synthetic or syntheticOpaque. a) Natural metavariables may be assigned by unification (i.e.,
isDefEq
).b) Synthetic metavariables may still be assigned by unification, but whenever possible
isDefEq
will avoid the assignment. For example, if we have the unification constraint?m =?= ?n
, where?m
is synthetic, but?n
is not,isDefEq
solves it by using the assignment?n := ?m
. We use synthetic metavariables for type class resolution. Any module that creates synthetic metavariables, must also check whether they have been assigned byisDefEq
, and then still synthesize them, and check whether the synthesized result is compatible with the one assigned byisDefEq
.c) SyntheticOpaque metavariables are never assigned by
isDefEq
. That is, the constraint?n =?= Nat.succ Nat.zero
always fail if?n
is a syntheticOpaque metavariable. This kind of metavariable is created by tactics such asintro
. Reason: in the tactic framework, subgoals as represented as metavariables, and a subgoal?n
is considered as solved whenever the metavariable is assigned.This distinction was not precise in Lean3 and produced counterintuitive behavior. For example, the following hack was added in Lean3 to work around one of these issues: https://github.com/leanprover/lean/blob/92826917a252a6092cffaf5fc5f1acb1f8cef379/src/library/type_context.cpp#L2751
-
When creating lambda/forall expressions, we need to convert/abstract free variables and convert them to bound variables. Now, suppose we are trying to create a lambda/forall expression by abstracting free variable
xs
and a termt[?m]
which contains a metavariable?m
, and the local context of?m
containsxs
. The term
fun xs => t[?m]
will be ill-formed if we later assign a term s
to ?m
, and
s
contains free variables in xs
. We address this issue by changing
the free variable abstraction procedure. We consider two cases: ?m
is natural or synthetic, or ?m
is syntheticOpaque. Assume the type of ?m
is
A[xs]
. Then, in both cases we create an auxiliary metavariable ?n
with
type forall xs => A[xs]
, and local context := local context of ?m
- xs
.
In both cases, we produce the term fun xs => t[?n xs]
1- If ?m
is natural or synthetic, then we assign ?m := ?n xs
, and we produce
the term fun xs => t[?n xs]
2- If ?m
is syntheticOpaque, then we mark ?n
as a syntheticOpaque variable.
However, ?n
is managed by the metavariable context itself.
We say we have a "delayed assignment" ?n xs := ?m
.
That is, after a term s
is assigned to ?m
, and s
does not contain metavariables, we replace any occurrence
?n ts
with s[xs := ts]
.
Gruesome details:
-
When we create the type
forall xs => A
for?n
, we may encounter the same issue ifA
contains metavariables. So, the process above is recursive. We claim it terminates because we keep creating new metavariables with smaller local contexts. -
Suppose, we have
t[?m]
and we want to create a let-expression by abstracting a let-decl free variablex
, and the local context of?m
containsx
. Similarly to the previous case
let x : T := v; t[?m]
will be ill-formed if we later assign a term s
to ?m
, and
s
contains free variable x
. Again, assume the type of ?m
is A[x]
.
1- If `?m` is natural or synthetic, then we create `?n : (let x : T := v; A[x])` with
and local context := local context of `?m` - `x`, we assign `?m := ?n`,
and produce the term `let x : T := v; t[?n]`. That is, we are just making
sure `?n` must never be assigned to a term containing `x`.
2- If `?m` is syntheticOpaque, we create a fresh syntheticOpaque `?n`
with type `?n : T -> (let x : T := v; A[x])` and local context := local context of `?m` - `x`,
create the delayed assignment `?n #[x] := ?m`, and produce the term `let x : T := v; t[?n x]`.
Now suppose we assign `s` to `?m`. We do not assign the term `fun (x : T) => s` to `?n`, since
`fun (x : T) => s` may not even be type correct. Instead, we just replace applications `?n r`
with `s[x/r]`. The term `r` may not necessarily be a bound variable. For example, a tactic
may have reduced `let x : T := v; t[?n x]` into `t[?n v]`.
We are essentially using the pair "delayed assignment + application" to implement a delayed
substitution.
- We use TC for implementing coercions. Both Joe Hendrix and Reid Barton
reported a nasty limitation. In Lean3, TC will not be used if there are
metavariables in the TC problem. For example, the elaborator will not try
to synthesize
Coe Nat ?x
. This is good, but this constraint is too strict for problems such asCoe (Vector Bool ?n) (BV ?n)
. The coercion exists independently of?n
. Thus, during TC, we wantisDefEq
to throw an exception instead of returnfalse
whenever it tries to assign a metavariable owned by its caller. The idea is to sign to the caller that it cannot solve the TC problem at this point, and more information is needed. That is, the caller must make progress an assign its metavariables before trying to invoke TC again.
In Lean4, we are using a simpler design for the MetavarContext
.
-
No distinction between temporary and regular metavariables.
-
Metavariables have a
depth
Nat field. -
MetavarContext also has a
depth
field. -
We bump the
MetavarContext
depth when we create a nested problem. Example: Elaborator (depth = 0) -> Simplifier matcher (depth = 1) -> TC (level = 2) -> TC (level = 3) -> ... -
When
MetavarContext
is at depth N,isDefEq
does not assign variables fromdepth < N
. -
Metavariables from depth N+1 must be fully assigned before we return to level N.
-
New design even allows us to invoke tactics from TC.
-
Main concern We don't have tmp metavariables anymore in Lean4. Thus, before trying to match the left-hand-side of an equation in
simp
. We first must bump the level of theMetavarContext
, create fresh metavariables, then create a new pattern by replacing the free variable on the left-hand-side with these metavariables. We are hoping to minimize this overhead by-
Using better indexing data structures in
simp
. They should reduce the number of timesimp
must invokeisDefEq
. -
Implementing
isDefEqApprox
which ignores metavariables and returns onlyfalse
orundef
. It is a quick filter that allows us to fail quickly and avoid the creation of new fresh metavariables, and a new pattern. -
Adding built-in support for arithmetic, Logical connectives, etc. Thus, we avoid a bunch of lemmas in the simp set.
-
Adding support for AC-rewriting. In Lean3, users use AC lemmas as rewriting rules for "sorting" terms. This is inefficient, requires a quadratic number of rewrite steps, and does not preserve the structure of the goal.
-
The temporary metavariables were also used in the "app builder" module used in Lean3. The app builder uses
isDefEq
. So, it could, in principle, invoke an arbitrary number of nested TC problems. However, in Lean3,
all app builder uses are controlled. That is, it is mainly used to synthesize implicit arguments using
very simple unification and/or non-nested TC. So, if the "app builder" becomes a bottleneck without tmp metavars,
we may solve the issue by implementing isDefEqCheap
that never invokes TC and uses tmp metavars.
LocalInstance
represents a local typeclass instance registered by and for
the elaborator. It stores the name of the typeclass in className
, and the
concrete typeclass instance in fvar
. Note that the kernel does not care about
this information, since typeclasses are entirely eliminated during elaboration.
Instances For
Equations
- Lean.instInhabitedLocalInstance = { default := { className := default, fvar := default } }
Equations
Instances For
Equations
- Lean.instBEqLocalInstance = { beq := fun i₁ i₂ => i₁.fvar == i₂.fvar }
Equations
- Lean.instHashableLocalInstance = { hash := fun i => hash i.fvar }
Remove local instance with the given fvarId
. Do nothing if localInsts
does not contain any free variable with id fvarId
.
Equations
- One or more equations did not get rendered due to their size.
Instances For
- natural: Lean.MetavarKind
Normal unification behaviour
- synthetic: Lean.MetavarKind
isDefEq
avoids assignment - syntheticOpaque: Lean.MetavarKind
Never assigned by isDefEq
A kind for the metavariable that determines its unification behaviour. For more information see the large comment at the beginning of this file.
Instances For
Equations
- Lean.instInhabitedMetavarKind = { default := Lean.MetavarKind.natural }
Equations
- Lean.instReprMetavarKind = { reprPrec := Lean.reprMetavarKind✝ }
Equations
- Lean.MetavarKind.isSyntheticOpaque x = match x with | Lean.MetavarKind.syntheticOpaque => true | x => false
Instances For
Equations
- Lean.MetavarKind.isNatural x = match x with | Lean.MetavarKind.natural => true | x => false
Instances For
- userName : Lake.Name
A user-friendly name for the metavariable. If anonymous then there is no such name.
- lctx : Lean.LocalContext
The local context containing the free variables that the mvar is permitted to depend upon.
- type : Lean.Expr
The type of the metavarible, in the given
lctx
. - depth : Nat
The nesting depth of this metavariable. We do not want unification subproblems to influence the results of parent problems. The depth keeps track of this information and ensures that unification subproblems cannot leak information out, by unifying based on depth.
- localInstances : Lean.LocalInstances
- kind : Lean.MetavarKind
- numScopeArgs : Nat
See comment at
CheckAssignment
Meta/ExprDefEq.lean
- index : Nat
We use this field to track how old a metavariable is. It is set using a counter at
MetavarContext
Information about a metavariable.
Instances For
Equations
- One or more equations did not get rendered due to their size.
- mvarIdPending : Lean.MVarId
A delayed assignment for a metavariable ?m
. It represents an assignment of the form ?m := (fun fvars => (mkMVar mvarIdPending))
.
mvarIdPending
is a syntheticOpaque
metavariable that has not been synthesized yet. The delayed assignment becomes a real one
as soon as mvarIdPending
has been fully synthesized.
fvars
are variables in the mvarIdPending
local context.
See the comment below assignDelayedMVar
for the rationale of delayed assignments.
Recall that we use a locally nameless approach when dealing with binders. Suppose we are
trying to synthesize ?n
in the expression e
, in the context of (fun x => e)
.
The metavariable ?n
might depend on the bound variable x
. However, since we are locally nameless,
the bound variable x
is in fact represented by some free variable fvar_x
. Thus, when we exit
the scope, we must rebind the value of fvar_x
in ?n
to the de-bruijn index of the bound variable x
.
Instances For
- depth : Nat
Depth is used to control whether an mvar can be assigned in unification.
- levelAssignDepth : Nat
At what depth level mvars can be assigned.
- mvarCounter : Nat
Counter for setting the field
index
atMetavarDecl
- lDepth : Lean.PersistentHashMap Lean.LMVarId Nat
Metavariable declarations.
- userNames : Lean.PersistentHashMap Lake.Name Lean.MVarId
Index mapping user-friendly names to ids.
- lAssignment : Lean.PersistentHashMap Lean.LMVarId Lean.Level
Assignment table for universe level metavariables.
- eAssignment : Lean.PersistentHashMap Lean.MVarId Lean.Expr
Assignment table for expression metavariables.
- dAssignment : Lean.PersistentHashMap Lean.MVarId Lean.DelayedMetavarAssignment
Assignment table for delayed abstraction metavariables. For more information about delayed abstraction, see the docstring for
DelayedMetavarAssignment
.
The metavariable context is a set of metavariable declarations and their assignments.
For more information on specifics see the comment in the file that MetavarContext
is defined in.
Instances For
- getMCtx : m Lean.MetavarContext
- modifyMCtx : (Lean.MetavarContext → Lean.MetavarContext) → m Unit
A monad with a stateful metavariable context, defining getMCtx
and modifyMCtx
.
Instances
Equations
- Lean.instMonadMCtx m n = { getMCtx := liftM Lean.getMCtx, modifyMCtx := fun f => liftM (Lean.modifyMCtx f) }
Equations
- Lean.getLevelMVarAssignment? mvarId = do let __do_lift ← Lean.getMCtx pure (Lean.PersistentHashMap.find? __do_lift.lAssignment mvarId)
Instances For
Equations
- Lean.MetavarContext.getExprAssignmentCore? m mvarId = Lean.PersistentHashMap.find? m.eAssignment mvarId
Instances For
Equations
- Lean.getExprMVarAssignment? mvarId = do let __do_lift ← Lean.getMCtx pure (Lean.MetavarContext.getExprAssignmentCore? __do_lift mvarId)
Instances For
Equations
- Lean.getDelayedMVarAssignment? mvarId = do let __do_lift ← Lean.getMCtx pure (Lean.PersistentHashMap.find? __do_lift.dAssignment mvarId)
Instances For
Given a sequence of delayed assignments
mvarId₁ := mvarId₂ ...;
...
mvarIdₙ := mvarId_root ... -- where `mvarId_root` is not delayed assigned
in mctx
, getDelayedRoot mctx mvarId₁
return mvarId_root
.
If mvarId₁
is not delayed assigned then return mvarId₁
Equations
- Lean.isLevelMVarAssigned mvarId = do let __do_lift ← Lean.getMCtx pure (Lean.PersistentHashMap.contains __do_lift.lAssignment mvarId)
Instances For
Return true
if the give metavariable is already assigned.
Equations
- Lean.MVarId.isAssigned mvarId = do let __do_lift ← Lean.getMCtx pure (Lean.PersistentHashMap.contains __do_lift.eAssignment mvarId)
Instances For
Equations
- Lean.isExprMVarAssigned mvarId = Lean.MVarId.isAssigned mvarId
Instances For
Equations
- Lean.MVarId.isDelayedAssigned mvarId = do let __do_lift ← Lean.getMCtx pure (Lean.PersistentHashMap.contains __do_lift.dAssignment mvarId)
Instances For
Equations
- Lean.isMVarDelayedAssigned mvarId = Lean.MVarId.isDelayedAssigned mvarId
Instances For
Equations
- One or more equations did not get rendered due to their size.
Instances For
Equations
- One or more equations did not get rendered due to their size.
Instances For
Equations
- Lean.MVarId.isAssignable mvarId = do let mctx ← Lean.getMCtx let decl : Lean.MetavarDecl := Lean.MetavarContext.getDecl mctx mvarId pure (decl.depth == mctx.depth)
Instances For
Equations
- Lean.isExprMVarAssignable mvarId = Lean.MVarId.isAssignable mvarId
Instances For
Return true iff the given level contains an assigned metavariable.
Equations
- One or more equations did not get rendered due to their size.
- Lean.hasAssignedLevelMVar (Lean.Level.succ lvl) = (pure (Lean.Level.hasMVar lvl) <&&> Lean.hasAssignedLevelMVar lvl)
- Lean.hasAssignedLevelMVar (Lean.Level.mvar mvarId) = Lean.isLevelMVarAssigned mvarId
- Lean.hasAssignedLevelMVar Lean.Level.zero = pure false
- Lean.hasAssignedLevelMVar (Lean.Level.param a) = pure false
Instances For
Return true
iff expression contains assigned (level/expr) metavariables or delayed assigned mvars
Equations
- One or more equations did not get rendered due to their size.
- Lean.hasAssignedMVar (Lean.Expr.const declName lvls) = List.anyM Lean.hasAssignedLevelMVar lvls
- Lean.hasAssignedMVar (Lean.Expr.sort lvl) = Lean.hasAssignedLevelMVar lvl
- Lean.hasAssignedMVar (Lean.Expr.app f a) = (pure (Lean.Expr.hasMVar f) <&&> Lean.hasAssignedMVar f <||> pure (Lean.Expr.hasMVar a) <&&> Lean.hasAssignedMVar a)
- Lean.hasAssignedMVar (Lean.Expr.fvar fvarId) = pure false
- Lean.hasAssignedMVar (Lean.Expr.bvar deBruijnIndex) = pure false
- Lean.hasAssignedMVar (Lean.Expr.lit a) = pure false
- Lean.hasAssignedMVar (Lean.Expr.mdata data e) = (pure (Lean.Expr.hasMVar e) <&&> Lean.hasAssignedMVar e)
- Lean.hasAssignedMVar (Lean.Expr.proj typeName idx e) = (pure (Lean.Expr.hasMVar e) <&&> Lean.hasAssignedMVar e)
- Lean.hasAssignedMVar (Lean.Expr.mvar mvarId) = (Lean.MVarId.isAssigned mvarId <||> Lean.MVarId.isDelayedAssigned mvarId)
Instances For
Return true iff the given level contains a metavariable that can be assigned.
Equations
- One or more equations did not get rendered due to their size.
- Lean.hasAssignableLevelMVar (Lean.Level.succ lvl) = (pure (Lean.Level.hasMVar lvl) <&&> Lean.hasAssignableLevelMVar lvl)
- Lean.hasAssignableLevelMVar (Lean.Level.mvar mvarId) = Lean.isLevelMVarAssignable mvarId
- Lean.hasAssignableLevelMVar Lean.Level.zero = pure false
- Lean.hasAssignableLevelMVar (Lean.Level.param a) = pure false
Instances For
Return true
iff expression contains a metavariable that can be assigned.
Equations
- One or more equations did not get rendered due to their size.
- Lean.hasAssignableMVar (Lean.Expr.const declName lvls) = List.anyM Lean.hasAssignableLevelMVar lvls
- Lean.hasAssignableMVar (Lean.Expr.sort lvl) = Lean.hasAssignableLevelMVar lvl
- Lean.hasAssignableMVar (Lean.Expr.app f a) = (pure (Lean.Expr.hasMVar f) <&&> Lean.hasAssignableMVar f <||> pure (Lean.Expr.hasMVar a) <&&> Lean.hasAssignableMVar a)
- Lean.hasAssignableMVar (Lean.Expr.fvar fvarId) = pure false
- Lean.hasAssignableMVar (Lean.Expr.bvar deBruijnIndex) = pure false
- Lean.hasAssignableMVar (Lean.Expr.lit a) = pure false
- Lean.hasAssignableMVar (Lean.Expr.mdata data e) = (pure (Lean.Expr.hasMVar e) <&&> Lean.hasAssignableMVar e)
- Lean.hasAssignableMVar (Lean.Expr.proj typeName idx e) = (pure (Lean.Expr.hasMVar e) <&&> Lean.hasAssignableMVar e)
- Lean.hasAssignableMVar (Lean.Expr.mvar mvarId) = Lean.MVarId.isAssignable mvarId
Instances For
Add mvarId := u
to the universe metavariable assignment.
This method does not check whether mvarId
is already assigned, nor it checks whether
a cycle is being introduced.
This is a low-level API, and it is safer to use isLevelDefEq (mkLevelMVar mvarId) u
.
Equations
- One or more equations did not get rendered due to their size.
Instances For
Add mvarId := x
to the metavariable assignment.
This method does not check whether mvarId
is already assigned, nor it checks whether
a cycle is being introduced, or whether the expression has the right type.
This is a low-level API, and it is safer to use isDefEq (mkMVar mvarId) x
.
Equations
- One or more equations did not get rendered due to their size.
Instances For
Equations
- Lean.assignExprMVar mvarId val = Lean.MVarId.assign mvarId val
Instances For
Equations
- One or more equations did not get rendered due to their size.
Instances For
Notes on artificial eta-expanded terms due to metavariables.
We try avoid synthetic terms such as ((fun x y => t) a b)
in the output produced by the elaborator.
This kind of term may be generated when instantiating metavariable assignments.
This module tries to avoid their generation because they often introduce unnecessary dependencies and
may affect automation.
When elaborating terms, we use metavariables to represent "holes". Each hole has a context which includes
all free variables that may be used to "fill" the hole. Suppose, we create a metavariable (hole) ?m : Nat
in a context
containing (x : Nat) (y : Nat) (b : Bool)
, then we can assign terms such as x + y
to ?m
since x
and y
are in the context used to create ?m
. Now, suppose we have the term ?m + 1
and we want to create the lambda expression
fun x => ?m + 1
. This term is not correct since we may assign to ?m
a term containing x
.
We address this issue by create a synthetic metavariable ?n : Nat → Nat
and adding the delayed assignment
?n #[x] := ?m
, and the term fun x => ?n x + 1
. When we later assign a term t[x]
to ?m
, fun x => t[x]
is assigned to
?n
, and if we substitute it at fun x => ?n x + 1
, we produce fun x => ((fun x => t[x]) x) + 1
.
To avoid this term eta-expanded term, we apply beta-reduction when instantiating metavariable assignments in this module.
This operation is performed at instantiateExprMVars
, elimMVarDeps
, and levelMVarToParam
.
instantiateExprMVars main function
Equations
- Lean.instMonadMCtxStateRefT'MetavarContextST = { getMCtx := get, modifyMCtx := modify }
Equations
- Lean.instantiateMVarsCore mctx e = let instantiate := fun {ω} e => Lean.instantiateExprMVars e; runST fun x => StateRefT'.run (Lean.MonadCacheT.run (instantiate e)) mctx
Instances For
Equations
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Instances For
Equations
- One or more equations did not get rendered due to their size.
Instances For
Equations
- One or more equations did not get rendered due to their size.
Instances For
Equations
- One or more equations did not get rendered due to their size.
Instances For
- visited : Lean.ExprSet
- mctx : Lean.MetavarContext
Instances For
Equations
- Lean.DependsOn.instMonadMCtxM = { getMCtx := do let __do_lift ← get pure __do_lift.mctx, modifyMCtx := fun f => modify fun s => { visited := s.visited, mctx := f s.mctx } }
Equations
- Lean.DependsOn.main pf pm e = if (!Lean.Expr.hasFVar e && !Lean.Expr.hasMVar e) = true then pure false else Lean.DependsOn.dep pf pm e
Instances For
Return true
iff e
depends on a free variable x
s.t. pf x
is true
, or an unassigned metavariable ?m
s.t. pm ?m
is true.
For each metavariable ?m
(that does not satisfy pm
occurring in x
1- If ?m := t
, then we visit t
looking for x
2- If ?m
is unassigned, then we consider the worst case and check whether x
is in the local context of ?m
.
This case is a "may dependency". That is, we may assign a term t
to ?m
s.t. t
contains x
.
Equations
- One or more equations did not get rendered due to their size.
Instances For
Similar to findExprDependsOn
, but checks the expressions in the given local declaration
depends on a free variable x
s.t. pf x
is true
or an unassigned metavariable ?m
s.t. pm ?m
is true.
Equations
- One or more equations did not get rendered due to their size.
Instances For
Equations
- Lean.exprDependsOn e fvarId = Lean.findExprDependsOn e fun x => fvarId == x
Instances For
Return true iff e
depends on the free variable fvarId
Equations
- Lean.dependsOn e fvarId = Lean.exprDependsOn e fvarId
Instances For
Return true iff localDecl
depends on the free variable fvarId
Equations
- Lean.localDeclDependsOn localDecl fvarId = Lean.findLocalDeclDependsOn localDecl fun x => fvarId == x
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Similar to exprDependsOn
, but x
can be a free variable or an unassigned metavariable.
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Similar to localDeclDependsOn
, but x
can be a free variable or an unassigned metavariable.
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Return true iff e
depends on a free variable x
s.t. pf x
, or an unassigned metavariable ?m
s.t. pm ?m
is true.
Equations
- Lean.dependsOnPred e pf pm = Lean.findExprDependsOn e pf pm
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Return true iff the local declaration localDecl
depends on a free variable x
s.t. pf x
, an unassigned metavariable ?m
s.t. pm ?m
is true.
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- Lean.localDeclDependsOnPred localDecl pf pm = Lean.findLocalDeclDependsOn localDecl pf pm
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Low level API for adding/declaring metavariable declarations.
It is used to implement actions in the monads MetaM
, ElabM
and TacticM
.
It should not be used directly since the argument (mvarId : MVarId)
is assumed to be "unique".
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- Lean.MetavarContext.addExprMVarDeclExp mctx mvarId userName lctx localInstances type kind = Lean.MetavarContext.addExprMVarDecl mctx mvarId userName lctx localInstances type kind
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Low level API for adding/declaring universe level metavariable declarations.
It is used to implement actions in the monads MetaM
, ElabM
and TacticM
.
It should not be used directly since the argument (mvarId : MVarId)
is assumed to be "unique".
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- Lean.MetavarContext.findDecl? mctx mvarId = Lean.PersistentHashMap.find? mctx.decls mvarId
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- Lean.MetavarContext.findUserName? mctx userName = Lean.PersistentHashMap.find? mctx.userNames userName
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Set the metavariable user facing name.
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Low-level version of setMVarUserName
.
It does not update the table userNames
. Thus, findUserName?
cannot see the modification.
It is meant for mkForallFVars'
where we temporarily set the user facing name of metavariables to get more
meaningful binder names.
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Update the type of the given metavariable. This function assumes the new type is definitionally equal to the current one
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- Lean.MetavarContext.findLevelDepth? mctx mvarId = Lean.PersistentHashMap.find? mctx.lDepth mvarId
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- Lean.MetavarContext.isAnonymousMVar mctx mvarId = match Lean.MetavarContext.findDecl? mctx mvarId with | none => false | some mvarDecl => Lean.Name.isAnonymous mvarDecl.userName
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- Lean.MetavarContext.instMonadMCtxStateRefT'MetavarContextST = { getMCtx := get, modifyMCtx := modify }
- revertFailure: Lean.MetavarContext → Lean.LocalContext → Array Lean.Expr → String → Lean.MetavarContext.MkBinding.Exception
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- mctx : Lean.MetavarContext
- nextMacroScope : Lean.MacroScope
- ngen : Lean.NameGenerator
- cache : Lean.HashMap Lean.ExprStructEq Lean.Expr
MkBinding
and elimMVarDepsAux
are mutually recursive, but cache
is only used at elimMVarDepsAux
.
We use a single state object for convenience.
We have a NameGenerator
because we need to generate fresh auxiliary metavariables.
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- mainModule : Lake.Name
- preserveOrder : Bool
- binderInfoForMVars : Lean.BinderInfo
When creating binders for abstracted metavariables, we use the following
BinderInfo
. - mvarIdsToAbstract : Lean.MVarIdSet
Set of unassigned metavariables being abstracted.
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- Lean.MetavarContext.MkBinding.preserveOrder = do let __do_lift ← read pure __do_lift.preserveOrder
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Given toRevert
an array of free variables s.t. lctx
contains their declarations,
return a new array of free variables that contains toRevert
and all variables
in lctx
that may depend on toRevert
.
Remark: the result is sorted by LocalDecl
indices.
Remark: We used to throw an Exception.revertFailure
exception when an auxiliary declaration
had to be reversed. Recall that auxiliary declarations are created when compiling (mutually)
recursive definitions. The revertFailure
due to auxiliary declaration dependency was originally
introduced in Lean3 to address issue https://github.com/leanprover/lean/issues/1258.
In Lean4, this solution is not satisfactory because all definitions/theorems are potentially
recursive. So, even a simple (incomplete) definition such as
variables {α : Type} in
def f (a : α) : List α :=
_
would trigger the Exception.revertFailure
exception. In the definition above,
the elaborator creates the auxiliary definition f : {α : Type} → List α
.
The _
is elaborated as a new fresh variable ?m
that contains α : Type
, a : α
, and f : α → List α
in its context,
When we try to create the lambda fun {α : Type} (a : α) => ?m
, we first need to create
an auxiliary ?n
which does not contain α
and a
in its context. That is,
we create the metavariable ?n : {α : Type} → (a : α) → (f : α → List α) → List α
,
add the delayed assignment ?n #[α, a, f] := ?m
, and create the lambda
fun {α : Type} (a : α) => ?n α a f
.
See elimMVarDeps
for more information.
If we kept using the Lean3 approach, we would get the Exception.revertFailure
exception because we are
reverting the auxiliary definition f
.
Note that https://github.com/leanprover/lean/issues/1258 is not an issue in Lean4 because we have changed how we compile recursive definitions.
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Create a new LocalContext
by removing the free variables in toRevert
from lctx
.
We use this function when we create auxiliary metavariables at elimMVarDepsAux
.
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- Lean.MetavarContext.MkBinding.elimMVarDeps xs e = if (!Lean.Expr.hasMVar e) = true then pure e else Lean.MetavarContext.MkBinding.withFreshCache (Lean.MetavarContext.MkBinding.elim xs e)
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Revert the variables xs
from the local context of mvarId
, returning
an expression representing the (new) reverted metavariable and the list of
variables that were actually reverted (this list will include any forward dependencies).
See details in the comment at the top of the file.
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Similar to Expr.abstractRange
, but handles metavariables correctly.
It uses elimMVarDeps
to ensure e
and the type of the free variables xs
do not
contain a metavariable ?m
s.t. local context of ?m
contains a free variable in xs
.
Equations
- Lean.MetavarContext.MkBinding.abstractRange xs i e = do let e ← Lean.MetavarContext.MkBinding.elimMVarDeps xs e pure (Lean.Expr.abstractRange e i xs)
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Similar to LocalContext.mkBinding
, but handles metavariables correctly.
If usedOnly == true
then forall
and lambda
expressions are created only for used variables.
If usedLetOnly == true
then let
expressions are created only for used (let-) variables.
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- mainModule : Lake.Name
- lctx : Lean.LocalContext
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- Lean.MetavarContext.mkLambda xs e usedOnly usedLetOnly binderInfoForMVars = do let __do_lift ← Lean.MetavarContext.mkBinding true xs e usedOnly usedLetOnly binderInfoForMVars pure __do_lift.fst
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- Lean.MetavarContext.mkForall xs e usedOnly usedLetOnly binderInfoForMVars = do let __do_lift ← Lean.MetavarContext.mkBinding false xs e usedOnly usedLetOnly binderInfoForMVars pure __do_lift.fst
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isWellFormed lctx e
returns true iff
- paramNamePrefix : Lake.Name
- except : Lean.LMVarId → Bool
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- mctx : Lean.MetavarContext
- nextParamIdx : Nat
- cache : Lean.HashMap Lean.ExprStructEq Lean.Expr
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- mctx : Lean.MetavarContext
- nextParamIdx : Nat
- expr : Lean.Expr
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- Lean.MetavarContext.getExprAssignmentDomain mctx = Lean.PersistentHashMap.foldl mctx.eAssignment (fun a mvarId x => Array.push a mvarId) #[]