Proof of Nuprl Lemma : add-graph-decls-declares-tag

Step * of Lemma add-graph-decls-declares-tag

∀dd:DeclSet. ∀G:Graph(|dd|). ∀T:Type. ∀a:Id ⟶ Id ⟶ Id. ∀b:Id.
  (es-decl-set-declares-tag{i:l}(dd;b;T) ⇒ es-decl-set-declares-tag{i:l}(add-graph-decls(dd;G;T;a;b);b;T))
BY
{ (Auto
   THEN D 1
   THEN D 2
   THEN All (RepUR ``es-decl-set-domain``)
   THEN RepUR ``es-decl-set-declares-tag`` -1
   THEN RepUR ``es-decl-set-declares-tag add-graph-decls`` 0
   THEN RepeatFor 3 (ParallelLast)) }

1
1. S : Id List@i'
2. d2 : {i:Id| (i ∈ S)}  ⟶ x:Id fp-> Type@i'
3. d3 : i:{i:Id| (i ∈ S)}  ⟶ k:{k:Knd| ↑hasloc(k;i)}  fp-> Type@i'
4. G : Graph(S)@i
5. T : Type@i'
6. a : Id ⟶ Id ⟶ Id@i
7. b : Id@i
8. ∀i:Id. ((i ∈ S) ⇒ (∀k:Knd. ((k ∈ fpf-domain(d3 i)) ⇒ (↑isrcv(k)) ⇒ (tag(k) = b ∈ Id) ⇒ (d3 i(k) = T ∈ Type))))@i'
9. i : Id@i
10. (i ∈ S)@i
11. ∀k:Knd. ((k ∈ fpf-domain(d3 i)) ⇒ (↑isrcv(k)) ⇒ (tag(k) = b ∈ Id) ⇒ (d3 i(k) = T ∈ Type))
12. k : Knd@i
13. (k ∈ fpf-domain(d3 i)) ⇒ (↑isrcv(k)) ⇒ (tag(k) = b ∈ Id) ⇒ (d3 i(k) = T ∈ Type)
⊢ (k ∈ fpf-domain(graph-rcvs(S;G;a;b;i) |-fpf-> T ⊕ d3 i))
⇒ (↑isrcv(k))
⇒ (tag(k) = b ∈ Id)
⇒ (graph-rcvs(S;G;a;b;i) |-fpf-> T ⊕ d3 i(k) = T ∈ Type)

Latex:

Latex:
\mforall{}dd:DeclSet. \mforall{}G:Graph(|dd|). \mforall{}T:Type. \mforall{}a:Id {}\mrightarrow{} Id {}\mrightarrow{} Id. \mforall{}b:Id. (es-decl-set-declares-tag\{i:l\}(dd;b;T) {}\mRightarrow{} es-decl-set-declares-tag\{i:l\}(add-graph-decls(dd;G;T;a;b);b;T)) By Latex: (Auto THEN D 1 THEN D 2 THEN All (RepUR ``es-decl-set-domain``) THEN RepUR ``es-decl-set-declares-tag`` -1 THEN RepUR ``es-decl-set-declares-tag add-graph-decls`` 0 THEN RepeatFor 3 (ParallelLast)) Home Index