| | Some definitions of interest. |
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| d-realizes | Def D
Def realizes es.P(es)
Def ==  D':Dsys.
Def == D  D'   (w:World, p:FairFifo. PossibleWorld(D';w) P(ES(w))) |
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| d-sub | Def D1 D2 == i:Id. M(i) M(i) |
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| dsys | Def Dsys == Id  MsgA |
| | | Thm* Dsys  Type{i'} |
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| Knd | Def Knd == (IdLnk Id)+Id |
| | | Thm* Knd Type |
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| Id | Def Id == Atom |
| | | Thm* Id Type |
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| d-single-frame | Def @i: only L affects x : t(j)
Def == if eqof(IdDeq)(j,i) only members of L affect x :t else fi |
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| es-E | Def E == 1of(es) |
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| es-after | Def (x after e)
Def == 1of(2of(2of(2of(2of(2of(2of(2of(2of(2of(2of(es)))))))))))(x,e) |
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| es-kind | Def kind(e) == 1of(2of(2of(2of(2of(2of(2of(2of(es))))))))(e) |
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| es-loc | Def loc(e) == 1of(2of(2of(2of(2of(2of(2of(es)))))))(e) |
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| es-vartype | Def vartype(i;x) == 1of(2of(2of(es)))(i,x) |
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| es-when | Def (x when e) == 1of(2of(2of(2of(2of(2of(2of(2of(2of(2of(es))))))))))(x,e) |
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| l_member | Def (x l) ==  i:. i<||l|| & x = l[i] T |
| | | Thm* T:Type, x:T, l:T List. (x l) Prop |
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| m-sys-at | Def @i: A(j) == if j = i A else fi |
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| ma-single-frame | Def only members of L affect x :t == mk-ma(x : t; ; ; ; ; ; x : L; ) |
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| not | Def  A == A False |
| | | Thm* A:Prop. (A) Prop |
