let GX be TopStruct ; for R being Subset of GX st R is open & R is closed holds
( R is closed_condensed iff R is open_condensed )
let R be Subset of GX; ( R is open & R is closed implies ( R is closed_condensed iff R is open_condensed ) )
assume that
A1:
R is open
and
A2:
R is closed
; ( R is closed_condensed iff R is open_condensed )
A3:
R = Cl R
by A2, PRE_TOPC:22;
R = Int R
by A1, Th55;
hence
( R is closed_condensed iff R is open_condensed )
by A3, Def7, Def8; verum