Proof of Nuprl Lemma : norm-lg

Step * 1 of Lemma norm-lg_wf

1. T : Type
2. value-type(T)
3. N : id-fun(T)
4. norm-lg(N) ∈ id-fun((T × ℤ List × (ℤ List)) List)
⊢ norm-lg(N) ∈ id-fun(LabeledGraph(T))
BY
{ (DoSubsume THEN Auto) }

1
1. T : Type
2. value-type(T)
3. N : id-fun(T)
4. norm-lg(N) ∈ id-fun((T × ℤ List × (ℤ List)) List)
5. norm-lg(N) = norm-lg(N) ∈ id-fun((T × ℤ List × (ℤ List)) List)
⊢ id-fun((T × ℤ List × (ℤ List)) List) ⊆r id-fun(LabeledGraph(T))

Latex:

Latex:
1. T : Type 2. value-type(T) 3. N : id-fun(T) 4. norm-lg(N) \mmember{} id-fun((T \mtimes{} \mBbbZ{} List \mtimes{} (\mBbbZ{} List)) List) \mvdash{} norm-lg(N) \mmember{} id-fun(LabeledGraph(T)) By Latex: (DoSubsume THEN Auto) Home Index