let X, Y be non empty TopSpace; for A being Subset of [:X,Y:]
for H being Subset-Family of [:X,Y:] st ( for e being set st e in H holds
( e c= A & ex X1 being Subset of X ex Y1 being Subset of Y st e = [:X1,Y1:] ) ) holds
[:(union ((Pr1 X,Y) .: H)),(meet ((Pr2 X,Y) .: H)):] c= A
let A be Subset of [:X,Y:]; for H being Subset-Family of [:X,Y:] st ( for e being set st e in H holds
( e c= A & ex X1 being Subset of X ex Y1 being Subset of Y st e = [:X1,Y1:] ) ) holds
[:(union ((Pr1 X,Y) .: H)),(meet ((Pr2 X,Y) .: H)):] c= A
let H be Subset-Family of [:X,Y:]; ( ( for e being set st e in H holds
( e c= A & ex X1 being Subset of X ex Y1 being Subset of Y st e = [:X1,Y1:] ) ) implies [:(union ((Pr1 X,Y) .: H)),(meet ((Pr2 X,Y) .: H)):] c= A )
assume A1:
for e being set st e in H holds
( e c= A & ex X1 being Subset of X ex Y1 being Subset of Y st e = [:X1,Y1:] )
; [:(union ((Pr1 X,Y) .: H)),(meet ((Pr2 X,Y) .: H)):] c= A
the carrier of [:X,Y:] = [:the carrier of X,the carrier of Y:]
by Def5;
hence
[:(union ((Pr1 X,Y) .: H)),(meet ((Pr2 X,Y) .: H)):] c= A
by A1, Th14; verum