Proof of Nuprl Lemma : make-proof-tree

Step * 1 2 of Lemma make-proof-tree_wf

1. Sequent : Type
2. Rule : Type
3. effect : (Sequent × Rule) ⟶ (Sequent List?)
4. s : Sequent
5. r : Rule
6. L : proof-tree(Sequent;Rule;effect) List
7. ↑isl(effect <s, r>)
8. ||L|| = ||outl(effect <s, r>)|| ∈ ℤ
9. make-proof-tree(s;r;L)
= make-proof-tree(s;r;L)
∈ (sr:Sequent × Rule × (case effect sr of inl(subgoals) => ℕ||subgoals|| | inr(x) => Void
⟶ proof-tree(Sequent;Rule;effect)))
⊢ (sr:Sequent × Rule × (case effect sr of inl(subgoals) => ℕ||subgoals|| | inr(x) => Void

                       ⟶ proof-tree(Sequent;Rule;effect))) ⊆r proof-tree(Sequent;Rule;effect)

BY
{ TACTIC:(InstLemma `proof-tree-ext` [⌜Sequent⌝;⌜Rule⌝;⌜effect⌝]⋅ THEN Auto) }

Latex:

Latex:
1. Sequent : Type 2. Rule : Type 3. effect : (Sequent \mtimes{} Rule) {}\mrightarrow{} (Sequent List?) 4. s : Sequent 5. r : Rule 6. L : proof-tree(Sequent;Rule;effect) List 7. \muparrow{}isl(effect <s, r>) 8. ||L|| = ||outl(effect <s, r>)|| 9. make-proof-tree(s;r;L) = make-proof-tree(s;r;L) \mvdash{} (sr:Sequent \mtimes{} Rule \mtimes{} (case effect sr of inl(subgoals) => \mBbbN{}||subgoals|| | inr(x) => Void {}\mrightarrow{} proof-tree(Sequent;Rule;effect))) \msubseteq{}r proof-tree(Sequent;Rule;effect) By Latex: TACTIC:(InstLemma `proof-tree-ext` [\mkleeneopen{}Sequent\mkleeneclose{};\mkleeneopen{}Rule\mkleeneclose{};\mkleeneopen{}effect\mkleeneclose{}]\mcdot{} THEN Auto) Home Index