the topology of Sierpinski_Space = {{} ,{1},{0 ,1}}
by WAYBEL18:def 9;
then
{1} in the topology of Sierpinski_Space
by ENUMSET1:def 1;
then reconsider A = {1} as open Subset of Sierpinski_Space by PRE_TOPC:def 5;
consider f being Function of (InclPoset the topology of X),(oContMaps X,Sierpinski_Space ) such that
A1:
f is isomorphic
and
A2:
for V being open Subset of X holds f . V = chi V,the carrier of X
by WAYBEL26:5;
rng f = [#] (oContMaps X,Sierpinski_Space )
by A1, WAYBEL_0:66;
then A3:
f " = f "
by A1, TOPS_2:def 4;
A4:
the carrier of (InclPoset the topology of X) = the topology of X
by YELLOW_1:1;
A5:
the carrier of Sierpinski_Space = {0 ,1}
by WAYBEL18:def 9;
now let x be
Element of
(oContMaps X,Sierpinski_Space );
(alpha X) . x = (f " ) . xreconsider g =
x as
continuous Function of
X,
Sierpinski_Space by WAYBEL26:2;
[#] Sierpinski_Space <> {}
;
then A6:
g " A is
open
by TOPS_2:55;
then A7:
g " A in the
topology of
X
by PRE_TOPC:def 5;
A8:
f . (g " A) =
chi (g " A),the
carrier of
X
by A2, A6
.=
x
by A5, FUNCT_3:49
;
thus (alpha X) . x =
g " A
by Def4
.=
(f " ) . x
by A1, A3, A4, A7, A8, FUNCT_2:32
;
verum end;
hence
alpha X is isomorphic
by A1, A3, FUNCT_2:113, WAYBEL_0:68; verum