let L be non empty RelStr ; :: thesis: for X being Subset of holds uparrow X = { x where x is Element of : ex y being Element of st
( x >= y & y in X ) }
let X be Subset of ; :: thesis: uparrow X = { x where x is Element of : ex y being Element of st
( x >= y & y in X ) }
set Y = { x where x is Element of : ex y being Element of st
( x >= y & y in X ) } ;
hereby :: according to TARSKI:def 3,XBOOLE_0:def 10 :: thesis: { x where x is Element of : ex y being Element of st
( x >= y & y in X ) } c= uparrow X
let x be set ; :: thesis: ( x in uparrow X implies x in { x where x is Element of : ex y being Element of st
( x >= y & y in X ) } )
assume A1: x in uparrow X ; :: thesis: x in { x where x is Element of : ex y being Element of st
( x >= y & y in X ) }
then reconsider y = x as Element of ;
ex z being Element of st
( z <= y & z in X ) by A1, Def16;
hence x in { x where x is Element of : ex y being Element of st
( x >= y & y in X ) } ; :: thesis: verum
end;
let x be set ; :: according to TARSKI:def 3 :: thesis: ( not x in { x where x is Element of : ex y being Element of st
( x >= y & y in X ) } or x in uparrow X )
assume x in { x where x is Element of : ex y being Element of st
( x >= y & y in X ) } ; :: thesis: x in uparrow X
then ex a being Element of st
( a = x & ex y being Element of st
( a >= y & y in X ) ) ;
hence x in uparrow X by Def16; :: thesis: verum