Particular point topology on the real numbers

Let $X=\mathbb R$ be the set of real numbers. A set is open in this topology if it contains the particular point $p=0$ or is empty.

Defined as counterexample #10 ("Uncountable Particular Point Topology") in DOI 10.1007/978-1-4612-6290-9.

Particular point topology on the real numbers is a counterexample to the converse of 0 theorems