let S, T be TopSpace; :: thesis: ( TopStruct(# the carrier of S,the topology of S #) = TopStruct(# the carrier of T,the topology of T #) & S is connected implies T is connected )
assume that
A1: TopStruct(# the carrier of S,the topology of S #) = TopStruct(# the carrier of T,the topology of T #) and
A2: S is connected ; :: thesis: T is connected
let A, B be Subset of T; :: according to CONNSP_1:def 2 :: thesis: ( not [#] T = A \/ B or not A,B are_separated or A = {} T or B = {} T )
assume that
A3: [#] T = A \/ B and
A4: A,B are_separated ; :: thesis: ( A = {} T or B = {} T )
reconsider A1 = A, B1 = B as Subset of S by A1;
A5: ( [#] S = the carrier of S & [#] T = the carrier of T ) ;
A1,B1 are_separated by A1, A4, Th5;
then ( A1 = {} S or B1 = {} S ) by A1, A2, A3, A5, CONNSP_1:def 2;
hence ( A = {} T or B = {} T ) ; :: thesis: verum