deffunc H1( Element of NAT ) -> Subset of X = meet (F ^\ $1);
consider f being SetSequence of X such that
A1: for n being Element of NAT holds f . n = H1(n) from FUNCT_2:sch 4();
 take Union f ; :: thesis: ex f being SetSequence of X st
( Union f = Union f & ( for n being Element of NAT holds f . n = meet (F ^\ n) ) )
thus ex f being SetSequence of X st
( Union f = Union f & ( for n being Element of NAT holds f . n = meet (F ^\ n) ) ) by A1; :: thesis: verum