A1:
"\/" ((union { X where X is Subset of F1() : P1[X] } ),F1()) is_>=_than { ("\/" (X,F1())) where X is Subset of F1() : P1[X] }
proof
let a be
Element of
F1();
LATTICE3:def 9 ( not a in { ("\/" (X,F1())) where X is Subset of F1() : P1[X] } or a <= "\/" ((union { X where X is Subset of F1() : P1[X] } ),F1()) )
assume
a in { ("\/" (X,F1())) where X is Subset of F1() : P1[X] }
;
a <= "\/" ((union { X where X is Subset of F1() : P1[X] } ),F1())
then consider q being
Subset of
F1()
such that A2:
a = "\/" (
q,
F1())
and A3:
P1[
q]
;
A4:
(
ex_sup_of q,
F1() &
ex_sup_of union { X where X is Subset of F1() : P1[X] } ,
F1() )
by YELLOW_0:17;
q in { X where X is Subset of F1() : P1[X] }
by A3;
hence
a <= "\/" (
(union { X where X is Subset of F1() : P1[X] } ),
F1())
by A2, A4, YELLOW_0:34, ZFMISC_1:74;
verum
end;
ex_sup_of { ("\/" (X,F1())) where X is Subset of F1() : P1[X] } ,F1()
by YELLOW_0:17;
hence
"\/" ( { ("\/" (X,F1())) where X is Subset of F1() : P1[X] } ,F1()) <= "\/" ((union { X where X is Subset of F1() : P1[X] } ),F1())
by A1, YELLOW_0:def 9; verum