let X be non empty TopSpace; :: thesis: for x being Point of X st Cl {x} = {x} holds
Sspace x is maximal_anti-discrete
let x be Point of X; :: thesis: ( Cl {x} = {x} implies Sspace x is maximal_anti-discrete )
assume Cl {x} = {x} ; :: thesis: Sspace x is maximal_anti-discrete
then ( {x} is maximal_anti-discrete & the carrier of (Sspace x) = {x} ) by Th47, TEX_2:def 4;
hence Sspace x is maximal_anti-discrete by Th74; :: thesis: verum