let X, Y be non empty TopSpace; for H being Subset-Family of [:X,Y:]
for C being set st C in (Pr2 X,Y) .: H holds
ex D being Subset of [:X,Y:] st
( D in H & C = (pr2 the carrier of X,the carrier of Y) .: D )
let H be Subset-Family of [:X,Y:]; for C being set st C in (Pr2 X,Y) .: H holds
ex D being Subset of [:X,Y:] st
( D in H & C = (pr2 the carrier of X,the carrier of Y) .: D )
let C be set ; ( C in (Pr2 X,Y) .: H implies ex D being Subset of [:X,Y:] st
( D in H & C = (pr2 the carrier of X,the carrier of Y) .: D ) )
assume
C in (Pr2 X,Y) .: H
; ex D being Subset of [:X,Y:] st
( D in H & C = (pr2 the carrier of X,the carrier of Y) .: D )
then consider u being set such that
A1:
u in dom (Pr2 X,Y)
and
A2:
u in H
and
A3:
C = (Pr2 X,Y) . u
by FUNCT_1:def 12;
reconsider u = u as Subset of [:X,Y:] by A1;
take
u
; ( u in H & C = (pr2 the carrier of X,the carrier of Y) .: u )
thus
u in H
by A2; C = (pr2 the carrier of X,the carrier of Y) .: u
the carrier of [:X,Y:] = [:the carrier of X,the carrier of Y:]
by Def5;
hence
C = (pr2 the carrier of X,the carrier of Y) .: u
by A3, Th10; verum