Proof of Nuprl Lemma : sequential-composition-inputs

Step * of Lemma sequential-composition-inputs_wf

∀[Info:Type]. ∀[f:Name ⟶ Type]. ∀[X:EClass(Interface)]. ∀[es:EO+(Info)]. ∀[e:E]. ∀[hdr:Name].

  sequential-composition-inputs(es;e;X;hdr) ∈ Message(f) List supposing single-valued-on-header{i:l}(Info;X;hdr)

BY
{ ProveWfLemma }

1
1. Info : Type
2. f : Name ⟶ Type
3. X : EClass(Interface)
4. es : EO+(Info)
5. e : E
6. hdr : Name
7. single-valued-on-header{i:l}(Info;X;hdr)

8. ∀x:bag(Interface). (↑((λxs.(#([x∈xs|name_eq(msg-header(x.msg);hdr) ∧_b x.dst = loc(e)]) =_z 1)) x) ∈ Type)

9. xs : bag(Interface)@i
10. ↑((λxs.(#([x∈xs|name_eq(msg-header(x.msg);hdr) ∧_b x.dst = loc(e)]) =_z 1)) xs)@i
⊢ single-valued-bag([x∈xs|name_eq(msg-header(x.msg);hdr) ∧_b x.dst = loc(e)];Interface)

2
1. Info : Type
2. f : Name ⟶ Type
3. X : EClass(Interface)
4. es : EO+(Info)
5. e : E
6. hdr : Name
7. single-valued-on-header{i:l}(Info;X;hdr)

8. ∀x:bag(Interface). (↑((λxs.(#([x∈xs|name_eq(msg-header(x.msg);hdr) ∧_b x.dst = loc(e)]) =_z 1)) x) ∈ Type)

9. xs : bag(Interface)@i
10. ↑((λxs.(#([x∈xs|name_eq(msg-header(x.msg);hdr) ∧_b x.dst = loc(e)]) =_z 1)) xs)@i
11. single-valued-bag([x∈xs|name_eq(msg-header(x.msg);hdr) ∧_b x.dst = loc(e)];Interface)
⊢ 0 < #([x∈xs|name_eq(msg-header(x.msg);hdr) ∧_b x.dst = loc(e)])

Latex:

Latex:
\mforall{}[Info:Type]. \mforall{}[f:Name {}\mrightarrow{} Type]. \mforall{}[X:EClass(Interface)]. \mforall{}[es:EO+(Info)]. \mforall{}[e:E]. \mforall{}[hdr:Name]. sequential-composition-inputs(es;e;X;hdr) \mmember{} Message(f) List supposing single-valued-on-header\{i:l\}(Info;X;hdr) By Latex: ProveWfLemma Home Index