A1: the carrier of Sierpinski_Space = {0 ,1} by WAYBEL18:def 9;
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;
let X be non empty TopSpace; :: thesis: for V being open Subset of X holds ((alpha X) " ) . V = chi V,the carrier of X
consider f being Function of (InclPoset the topology of X),(oContMaps X,Sierpinski_Space ) such that
A2: f is isomorphic and
A3: for V being open Subset of X holds f . V = chi V,the carrier of X by WAYBEL26:5;
A4: the carrier of (InclPoset the topology of X) = the topology of X by YELLOW_1:1;
A5: rng f = [#] (oContMaps X,Sierpinski_Space ) by A2, WAYBEL_0:66;
then A6: f " = f " by A2, TOPS_2:def 4;
now
let x be Element of (oContMaps X,Sierpinski_Space ); :: thesis: (alpha X) . x = (f " ) . x
reconsider g = x as continuous Function of X,Sierpinski_Space by WAYBEL26:2;
[#] Sierpinski_Space <> {} ;
then A7: g " A is open by TOPS_2:55;
then A8: g " A in the topology of X by PRE_TOPC:def 5;
A9: f . (g " A) = chi (g " A),the carrier of X by A3, A7
.= x by A1, FUNCT_3:49 ;
thus (alpha X) . x = g " A by Def4
.= (f " ) . x by A2, A6, A4, A8, A9, FUNCT_2:32 ; :: thesis: verum
end;
then alpha X = f " by FUNCT_2:113;
then (alpha X) " = f by A2, A5, TOPS_2:64;
hence for V being open Subset of X holds ((alpha X) " ) . V = chi V,the carrier of X by A3; :: thesis: verum