let S be TopSpace; :: thesis:
let T be non empty TopSpace; :: thesis:
set SS = TopStruct(# the carrier of S,the topology of S #);
set TT = TopStruct(# the carrier of T,the topology of T #);
A1: ( [#] S = [#] TopStruct(# the carrier of S,the topology of S #) & [#] T = [#] TopStruct(# the carrier of T,the topology of T #) ) ;
thus ( S,T are_homeomorphic implies TopStruct(# the carrier of S,the topology of S #), TopStruct(# the carrier of T,the topology of T #) are_homeomorphic ) :: thesis:

given f being Function of S,T such that A2: f is being_homeomorphism ; :: according to T_0TOPSP:def 1 :: thesis:
reconsider g = f as Function of TopStruct(# the carrier of S,the topology of S #),TopStruct(# the carrier of T,the topology of T #) ;

A3: now

let P be Subset of TopStruct(# the carrier of S,the topology of S #); :: thesis:
reconsider R = P as Subset of S ;
thus g .: (Cl P) = f .: (Cl R) by TOPS_3:80
.= Cl (f .: R) by A2, TOPS_2:74
.= Cl (g .: P) by TOPS_3:80 ; :: thesis:

end;

take g ; :: according to T_0TOPSP:def 1 :: thesis:
( dom f = [#] S & rng f = [#] T ) by A2, TOPS_2:74;
hence g is being_homeomorphism by A1, A2, A3, TOPS_2:74; :: thesis:

end;

given f being Function of TopStruct(# the carrier of S,the topology of S #),TopStruct(# the carrier of T,the topology of T #) such that A4: f is being_homeomorphism ; :: according to T_0TOPSP:def 1 :: thesis:
reconsider g = f as Function of S,T ;

A5: now

let P be Subset of S; :: thesis:
reconsider R = P as Subset of TopStruct(# the carrier of S,the topology of S #) ;
thus g .: (Cl P) = f .: (Cl R) by TOPS_3:80
.= Cl (f .: R) by A4, TOPS_2:74
.= Cl (g .: P) by TOPS_3:80 ; :: thesis:

end;

take g ; :: according to T_0TOPSP:def 1 :: thesis:
( dom f = [#] TopStruct(# the carrier of S,the topology of S #) & rng f = [#] TopStruct(# the carrier of T,the topology of T #) ) by A4, TOPS_2:74;
hence g is being_homeomorphism by A1, A4, A5, TOPS_2:74; :: thesis: