Documentation

Mathlib.Tactic.GeneralizeProofs

The generalize_proofs tactic #

Generalize any proofs occurring in the goal or in chosen hypotheses, replacing them by local hypotheses. When these hypotheses are named, this makes it easy to refer to these proofs later in a proof, commonly useful when dealing with functions like Classical.choose that produce data from proofs. It is also useful to eliminate proof terms to handle issues with dependent types.

For example:

example : List.nthLe [1, 2] 1 (by simp) = 2 := by
  -- ⊢ [1, 2].nthLe 1 ⋯ = 2
  generalize_proofs h
  -- h : 1 < [1, 2].length
  -- ⊢ [1, 2].nthLe 1 h = 2

The tactic is similar in spirit to Lean.Meta.AbstractNestedProofs in core. One difference is that it the tactic tries to propagate expected types so that we get 1 < [1, 2].length in the above example rather than 1 < Nat.succ 1.

Configuration for the generalize_proofs tactic.

  • maxDepth : Nat

    The maximum recursion depth when generalizing proofs. When maxDepth > 0, then proofs are generalized from the types of the generalized proofs too.

  • abstract : Bool

    When abstract is true, then the tactic will create universally quantified proofs to account for bound variables. When it is false then such proofs are left alone.

  • debug : Bool

    (Debugging) When true, enables consistency checks.

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    Elaborates a Parser.Tactic.config for generalize_proofs.

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      State for the MGen monad.

      • propToFVar : Lean.ExprMap Lean.Expr

        Mapping from propositions to an fvar in the local context with that type.

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        Inserts a prop/fvar pair into the propToFVar map.

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          Context for the MAbs monad.

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            State for the MAbs monad.

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              @[inline, reducible]

              Monad used to abstract proofs, to prepare for generalization. Has a cache (of expr/type? pairs), and it also has a reader context Mathlib.Tactic.GeneralizeProofs.AContext and a state Mathlib.Tactic.GeneralizeProofs.AState.

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                Runs MAbs in MGen. Returns the value and the generalizations.

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                  Finds a proof of prop by looking at propToFVar and propToProof.

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                    Generalize prop, where proof is its proof.

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                      Runs x with an additional local variable.

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                        Runs x with an increased recursion depth and the initial local context, clearing fvars.

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                          Computes expected types for each argument to f, given that the type of mkAppN f args is supposed to be ty? (where if ty? is none, there's no type to propagate inwards).

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                            Core implementation for appArgExpectedTypes.

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                              Does mkLambdaFVars fvars e but

                              1. zeta reduces let bindings
                              2. only includes used fvars
                              3. returns the list of fvars that were actually abstracted
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                                Abstract proofs occurring in the expression. A proof is abstracted if it is of the form f a b ... where a b ... are bound variables (that is, they are variables that are not present in the initial local context) and where f contains no bound variables. In this form, f can be immediately lifted to be a local variable and generalized. The abstracted proofs are recorded in the state.

                                This function is careful to track the type of e based on where it's used, since the inferred type might be different. For example, (by simp : 1 < [1, 2].length) has 1 < Nat.succ 1 as the inferred type, but from knowing it's an argument to List.nthLe we can deduce 1 < [1, 2].length.

                                Create a mapping of all propositions in the local context to their fvars.

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                                  Generalizes the proofs in the type e and runs k in a local context with these propositions. This continuation k is passed

                                  1. an array of fvars for the propositions
                                  2. an array of proof terms (extracted from e) that prove these propositions
                                  3. the generalized e, which refers to these fvars

                                  The propToFVar map is updated with the new proposition fvars.

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                                    Main loop for Lean.MVarId.generalizeProofs. The fvars array is the array of fvars to generalize proofs for, and rfvars is the array of fvars that have been reverted. The g metavariable has all of these fvars reverted.

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                                      Generalize proofs in the hypotheses fvars and, if target is true, the target. Returns the fvars for the generalized proofs and the new goal.

                                      If a hypothesis is a proposition and a let binding, this will clear the value of the let binding.

                                      If a hypothesis is a proposition that already appears in the local context, it will be eliminated.

                                      Only nontrivial proofs are generalized. These are proofs that aren't of the form f a b ... where f is atomic and a b ... are bound variables. These sorts of proofs cannot be meaningfully generalized, and also these are the sorts of proofs that are left in a term after generalization.

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                                        generalize_proofs ids* [at locs]? generalizes proofs in the current goal, turning them into new local hypotheses.

                                        • generalize_proofs generalizes proofs in the target.
                                        • generalize_proofs at h₁ h₂ generalized proofs in hypotheses h₁ and h₂.
                                        • generalize_proofs at * generalizes proofs in the entire local context.
                                        • generalize_proofs pf₁ pf₂ pf₃ uses names pf₁, pf₂, and pf₃ for the generalized proofs. These can be _ to not name proofs.

                                        If a proof is already present in the local context, it will use that rather than create a new local hypothesis.

                                        When doing generalize_proofs at h, if h is a let binding, its value is cleared, and furthermore if h duplicates a preceding local hypothesis then it is eliminated.

                                        The tactic is able to abstract proofs from under binders, creating universally quantified proofs in the local context. To disable this, use generalize_proofs (config := { abstract := false }). The tactic is also set to recursively abstract proofs from the types of the generalized proofs. This can be controlled with the maxDepth configuration option, with generalize_proofs (config := { maxDepth := 0 }) turning this feature off.

                                        For example:

                                        example : List.nthLe [1, 2] 1 (by simp) = 2 := by
                                          -- ⊢ [1, 2].nthLe 1 ⋯ = 2
                                          generalize_proofs h
                                          -- h : 1 < [1, 2].length
                                          -- ⊢ [1, 2].nthLe 1 h = 2
                                        
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