Proof of Nuprl Lemma : flow-graph-information-flow-relation

Step * of Lemma flow-graph-information-flow-relation

∀[Info,T:Type].
  ∀S:Id List. ∀G:Graph(S). ∀F:information-flow(T;S). ∀es:EO+(Info). ∀X:EClass(T). ∀e:E(X). ∀i:Id.
    ((i ∈ S)
    ⇒ es-interface-locs-list(es;X;S)
    ⇒ flow-graph(S;T;F;G)
    ⇒ (loc(e)⟶i)∈G supposing information-flow-relation(es;X;F;e;i))
BY
{ (BasicUniformUnivCD Auto THEN (UnivCD THENA Try (Complete (Auto)))) }

1
.....wf.....
1. Info : Type
2. T : Type
3. S : Id List@i
4. G : Graph(S)@i
5. F : information-flow(T;S)@i
6. es : EO+(Info)@i'
7. X : EClass(T)@i'
8. e : E(X)@i
9. i : Id@i
10. (i ∈ S)@i
11. es-interface-locs-list(es;X;S)@i
12. flow-graph(S;T;F;G)@i
13. ↑can-apply(F loc(e) i;X(≤(X)(e)))
⊢ can-apply(F loc(e) i;X(≤(X)(e))) ∈ 𝔹

2
1. [Info] : Type
2. [T] : Type
3. S : Id List@i
4. G : Graph(S)@i
5. F : information-flow(T;S)@i
6. es : EO+(Info)@i'
7. X : EClass(T)@i'
8. e : E(X)@i
9. i : Id@i
10. (i ∈ S)@i
11. es-interface-locs-list(es;X;S)@i
12. flow-graph(S;T;F;G)@i
13. information-flow-relation(es;X;F;e;i)
⊢ (loc(e)⟶i)∈G

Latex:

Latex:
\mforall{}[Info,T:Type]. \mforall{}S:Id List. \mforall{}G:Graph(S). \mforall{}F:information-flow(T;S). \mforall{}es:EO+(Info). \mforall{}X:EClass(T). \mforall{}e:E(X). \mforall{}i:Id. ((i \mmember{} S) {}\mRightarrow{} es-interface-locs-list(es;X;S) {}\mRightarrow{} flow-graph(S;T;F;G) {}\mRightarrow{} (loc(e){}\mrightarrow{}i)\mmember{}G supposing information-flow-relation(es;X;F;e;i)) By Latex: (BasicUniformUnivCD Auto THEN (UnivCD THENA Try (Complete (Auto)))) Home Index