lean2/tests/lean/run/dep_subst.lean

import data.finset
open subtype setoid finset set

inductive finite_set [class] {T : Type} (xs : set T) :=
| mk : ∀ (fxs : finset T), to_set fxs = xs → finite_set xs

definition card {T : Type} (xs : set T) [fn : finite_set xs] : nat :=
begin
  induction fn,
  exact finset.card fxs
end

example {T : Type} (xs : set T) [fn₁ fn₂ : finite_set xs] : @card T xs fn₁ = @card T xs fn₂ :=
begin
  induction fn₁ with fxs₁ h₁,
  induction fn₂ with fxs₂ h₂,
  subst xs,
  apply sorry
end

example {T : Type} (xs : set T) [fn₁ fn₂ : finite_set xs] : @card T xs fn₁ = @card T xs fn₂ :=
begin
  induction fn₁ with fxs₁ h₁,
  induction fn₂ with fxs₂ h₂,
  subst xs,
  let aux := to_set.inj h₂,
  subst aux
end
fix(library/tactic/subst_tactic): in the standard mode, use dependent elimination in the subst tactic (when needed) Before this commit, the subst tactic was producing an type incorrect result when dependent elimination was needed (see new test for an example). 2015-06-04 00:35:03 +00:00			`import data.finset`
			`open subtype setoid finset set`

			`inductive finite_set [class] {T : Type} (xs : set T) :=`
			`\| mk : ∀ (fxs : finset T), to_set fxs = xs → finite_set xs`

			`definition card {T : Type} (xs : set T) [fn : finite_set xs] : nat :=`
			`begin`
			`induction fn,`
			`exact finset.card fxs`
			`end`

			`example {T : Type} (xs : set T) [fn₁ fn₂ : finite_set xs] : @card T xs fn₁ = @card T xs fn₂ :=`
			`begin`
			`induction fn₁ with fxs₁ h₁,`
			`induction fn₂ with fxs₂ h₂,`
			`subst xs,`
			`apply sorry`
			`end`

			`example {T : Type} (xs : set T) [fn₁ fn₂ : finite_set xs] : @card T xs fn₁ = @card T xs fn₂ :=`
			`begin`
			`induction fn₁ with fxs₁ h₁,`
			`induction fn₂ with fxs₂ h₂,`
			`subst xs,`
			`let aux := to_set.inj h₂,`
			`subst aux`
			`end`