let GX be non empty TopSpace; for A0, A1, A2 being Subset of GX st A0 is connected & A1 is connected & A2 is connected & A0 meets A1 & A1 meets A2 holds
(A0 \/ A1) \/ A2 is connected
let A0, A1, A2 be Subset of GX; ( A0 is connected & A1 is connected & A2 is connected & A0 meets A1 & A1 meets A2 implies (A0 \/ A1) \/ A2 is connected )
assume that
A1:
A0 is connected
and
A2:
A1 is connected
and
A3:
A2 is connected
and
A4:
A0 meets A1
and
A5:
A1 meets A2
; (A0 \/ A1) \/ A2 is connected
A6:
A1 /\ A2 <> {}
by A5;
A7:
A0 \/ A1 is connected
by A1, A2, A4, CONNSP_1:1, CONNSP_1:17;
(A0 \/ A1) /\ A2 = (A0 /\ A2) \/ (A1 /\ A2)
by XBOOLE_1:23;
then
A0 \/ A1 meets A2
by A6;
hence
(A0 \/ A1) \/ A2 is connected
by A3, A7, CONNSP_1:1, CONNSP_1:17; verum