Std.Tactic.Simpa

Enables the 'unnecessary simpa' linter. This will report if a use of simpa could be proven using simp or simp at h instead.

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def Std.Tactic.Simpa.simpaArgsRest :

Lean.ParserDescr

The arguments to the simpa family tactics.

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Instances For

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def Std.Tactic.Simpa.simpa :

Lean.ParserDescr

This is a "finishing" tactic modification of simp. It has two forms.

simpa [rules, ⋯] using e will simplify the goal and the type of e using rules, then try to close the goal using e.

Simplifying the type of e makes it more likely to match the goal (which has also been simplified). This construction also tends to be more robust under changes to the simp lemma set.

simpa [rules, ⋯] will simplify the goal and the type of a hypothesis this if present in the context, then try to close the goal using the assumption tactic.

#TODO: implement ?

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def Std.Tactic.Simpa.tacticSimpa!_ :

Lean.ParserDescr

This is a "finishing" tactic modification of simp. It has two forms.

simpa [rules, ⋯] using e will simplify the goal and the type of e using rules, then try to close the goal using e.

Simplifying the type of e makes it more likely to match the goal (which has also been simplified). This construction also tends to be more robust under changes to the simp lemma set.

simpa [rules, ⋯] will simplify the goal and the type of a hypothesis this if present in the context, then try to close the goal using the assumption tactic.

#TODO: implement ?

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def Std.Tactic.Simpa.tacticSimpa?_ :

Lean.ParserDescr

This is a "finishing" tactic modification of simp. It has two forms.

simpa [rules, ⋯] using e will simplify the goal and the type of e using rules, then try to close the goal using e.

Simplifying the type of e makes it more likely to match the goal (which has also been simplified). This construction also tends to be more robust under changes to the simp lemma set.

simpa [rules, ⋯] will simplify the goal and the type of a hypothesis this if present in the context, then try to close the goal using the assumption tactic.

#TODO: implement ?

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def Std.Tactic.Simpa.tacticSimpa?!_ :

Lean.ParserDescr

This is a "finishing" tactic modification of simp. It has two forms.

simpa [rules, ⋯] using e will simplify the goal and the type of e using rules, then try to close the goal using e.

Simplifying the type of e makes it more likely to match the goal (which has also been simplified). This construction also tends to be more robust under changes to the simp lemma set.

simpa [rules, ⋯] will simplify the goal and the type of a hypothesis this if present in the context, then try to close the goal using the assumption tactic.

#TODO: implement ?

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def Std.Tactic.Simpa.getLinterUnnecessarySimpa (o : Lean.Options) :

Bool

Gets the value of the linter.unnecessarySimpa option.

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Std.Tactic.Simpa.getLinterUnnecessarySimpa o = Lean.Linter.getLinterValue linter.unnecessarySimpa o

Instances For

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instance Std.Tactic.Simpa.instReprUseImplicitLambdaResult :

Repr Lean.Elab.Term.UseImplicitLambdaResult

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Std.Tactic.Simpa.instReprUseImplicitLambdaResult = { reprPrec := Std.Tactic.Simpa.reprUseImplicitLambdaResult✝ }