consider F being thin_cylinder of A,B;
A1: now
let z be set ; :: thesis: ( z in { D where D is Subset of (Funcs B,A) : D is thin_cylinder of A,B } implies z in bool (Funcs B,A) )
assume z in { D where D is Subset of (Funcs B,A) : D is thin_cylinder of A,B } ; :: thesis: z in bool (Funcs B,A)
then ex D being Subset of (Funcs B,A) st
( z = D & D is thin_cylinder of A,B ) ;
hence z in bool (Funcs B,A) ; :: thesis: verum
end;
F in { D where D is Subset of (Funcs B,A) : D is thin_cylinder of A,B } ;
hence { D where D is Subset of (Funcs B,A) : D is thin_cylinder of A,B } is non empty Subset-Family of (Funcs B,A) by A1, TARSKI:def 3; :: thesis: verum