{ 
es:EO. e:E. e':{a:E| loc(a) = loc(e)} . ((e' 
loc(e)) 
e' loc e ) }
{ Proof }
Definitions occuring in Statement :
es-le-before: loc(e),
es-le: e loc e' ,
es-loc: loc(e),
es-E: E,
event_ordering: EO,
Id: Id,
all: x:A. B[x],
iff: P Q,
set: {x:A| B[x]} ,
equal: s = t,
l_member: (x l)
Definitions :
all: x:A. B[x],
iff: P Q,
l_member: (x l),
member: t T,
and: P 
Q,
implies: P Q,
rev_implies: P Q,
exists: 
x:A. B[x],
cand: A c B,
prop: 
,
subtype: S 
T,
squash: 
T,
true: True,
nat: 
Lemmas :
member-es-le-before,
es-E_wf,
Id_wf,
es-loc_wf,
length_wf1,
es-le-before_wf,
select_wf,
l_member_wf,
es-le_wf,
event_ordering_wf,
member_wf
\mforall{}es:EO. \mforall{}e:E. \mforall{}e':\{a:E| loc(a) = loc(e)\} . ((e' \mmember{} \mleq{}loc(e)) \mLeftarrow{}{}\mRightarrow{} e' \mleq{}loc e )
Date html generated:
2011_08_16-AM-10_38_06
Last ObjectModification:
2010_09_24-PM-09_06_54
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