let N be Hausdorff complete Lawson meet-continuous TopLattice; for x being Element of N holds x = "\/" ( { (inf V) where V is Subset of N : ( x in V & V in lambda N ) } ,N)
let x be Element of N; x = "\/" ( { (inf V) where V is Subset of N : ( x in V & V in lambda N ) } ,N)
set S = the complete Scott TopAugmentation of N;
A1:
InclPoset (sigma the complete Scott TopAugmentation of N) is continuous
by WAYBEL14:36;
A2:
RelStr(# the carrier of the complete Scott TopAugmentation of N, the InternalRel of the complete Scott TopAugmentation of N #) = RelStr(# the carrier of N, the InternalRel of N #)
by YELLOW_9:def 4;
then reconsider y = x as Element of the complete Scott TopAugmentation of N ;
for y being Element of the complete Scott TopAugmentation of N ex J being Basis of y st
for X being Subset of the complete Scott TopAugmentation of N st X in J holds
( X is open & X is filtered )
by WAYBEL14:35;
hence x =
"\/" ( { (inf X) where X is Subset of the complete Scott TopAugmentation of N : ( y in X & X in sigma the complete Scott TopAugmentation of N ) } , the complete Scott TopAugmentation of N)
by A1, WAYBEL14:37
.=
"\/" ( { (inf X) where X is Subset of the complete Scott TopAugmentation of N : ( x in X & X in sigma the complete Scott TopAugmentation of N ) } ,N)
by A2, YELLOW_0:17, YELLOW_0:26
.=
"\/" ( { (inf V) where V is Subset of N : ( x in V & V in lambda N ) } ,N)
by Th34
;
verum