let X be non empty TopSpace; for A1, A2 being Subset of X st A1 \/ A2 = the carrier of X holds
( A1,A2 are_weakly_separated iff ex C1, C2, C being Subset of X st
( A1 \/ A2 = (C1 \/ C2) \/ C & C1 c= A1 & C2 c= A2 & C c= A1 /\ A2 & C1 is closed & C2 is closed & C is open ) )
let A1, A2 be Subset of X; ( A1 \/ A2 = the carrier of X implies ( A1,A2 are_weakly_separated iff ex C1, C2, C being Subset of X st
( A1 \/ A2 = (C1 \/ C2) \/ C & C1 c= A1 & C2 c= A2 & C c= A1 /\ A2 & C1 is closed & C2 is closed & C is open ) ) )
assume A1:
A1 \/ A2 = the carrier of X
; ( A1,A2 are_weakly_separated iff ex C1, C2, C being Subset of X st
( A1 \/ A2 = (C1 \/ C2) \/ C & C1 c= A1 & C2 c= A2 & C c= A1 /\ A2 & C1 is closed & C2 is closed & C is open ) )
thus
( A1,A2 are_weakly_separated implies ex C1, C2, C being Subset of X st
( A1 \/ A2 = (C1 \/ C2) \/ C & C1 c= A1 & C2 c= A2 & C c= A1 /\ A2 & C1 is closed & C2 is closed & C is open ) )
( ex C1, C2, C being Subset of X st
( A1 \/ A2 = (C1 \/ C2) \/ C & C1 c= A1 & C2 c= A2 & C c= A1 /\ A2 & C1 is closed & C2 is closed & C is open ) implies A1,A2 are_weakly_separated )
given C1, C2, C being Subset of X such that A3:
( A1 \/ A2 = (C1 \/ C2) \/ C & C1 c= A1 & C2 c= A2 & C c= A1 /\ A2 & C1 is closed & C2 is closed & C is open )
; A1,A2 are_weakly_separated
ex C1, C2, C being Subset of X st
( C1 /\ (A1 \/ A2) c= A1 & C2 /\ (A1 \/ A2) c= A2 & C /\ (A1 \/ A2) c= A1 /\ A2 & the carrier of X = (C1 \/ C2) \/ C & C1 is closed & C2 is closed & C is open )
hence
A1,A2 are_weakly_separated
by Th54; verum