let T be non empty TopSpace; :: thesis: for A, B being Subset of st A c= B holds
Der A c= Der B
let A, B be Subset of ; :: thesis: ( A c= B implies Der A c= Der B )
assume A1: A c= B ; :: thesis: Der A c= Der B
let x be set ; :: according to TARSKI:def 3 :: thesis: ( not x in Der A or x in Der B )
assume A2: x in Der A ; :: thesis: x in Der B
then reconsider x' = x as Point of ;
for U being open Subset of st x' in U holds
ex y being Point of st
( y in B /\ U & x' <> y )
proof
let U be open Subset of ; :: thesis: ( x' in U implies ex y being Point of st
( y in B /\ U & x' <> y ) )
assume x' in U ; :: thesis: ex y being Point of st
( y in B /\ U & x' <> y )
then A3: ex y being Point of st
( y in A /\ U & x' <> y ) by A2, Th19;
A /\ U c= B /\ U by A1, XBOOLE_1:26;
hence ex y being Point of st
( y in B /\ U & x' <> y ) by A3; :: thesis: verum
end;
hence x in Der B by Th19; :: thesis: verum